Expressions#

This page gives an overview of all public Polars expressions.

class polars.Expr[source]

Expressions that can be used in various contexts.

Methods:

abs

Compute absolute values.

add

Method equivalent of addition operator expr + other.

agg_groups

Get the group indexes of the group by operation.

alias

Rename the expression.

all

Return whether all values in the column are True.

and_

Method equivalent of bitwise "and" operator expr & other & ....

any

Return whether any of the values in the column are True.

append

Append expressions.

approx_n_unique

Approximate count of unique values.

arccos

Compute the element-wise value for the inverse cosine.

arccosh

Compute the element-wise value for the inverse hyperbolic cosine.

arcsin

Compute the element-wise value for the inverse sine.

arcsinh

Compute the element-wise value for the inverse hyperbolic sine.

arctan

Compute the element-wise value for the inverse tangent.

arctanh

Compute the element-wise value for the inverse hyperbolic tangent.

arg_max

Get the index of the maximal value.

arg_min

Get the index of the minimal value.

arg_sort

Get the index values that would sort this column.

arg_true

Return indices where expression evaluates True.

arg_unique

Get index of first unique value.

backward_fill

Fill missing values with the next to be seen values.

bottom_k

Return the k smallest elements.

bottom_k_by

Return the elements corresponding to the k smallest elements of the by column(s).

cast

Cast between data types.

cbrt

Compute the cube root of the elements.

ceil

Rounds up to the nearest integer value.

clip

Set values outside the given boundaries to the boundary value.

cos

Compute the element-wise value for the cosine.

cosh

Compute the element-wise value for the hyperbolic cosine.

cot

Compute the element-wise value for the cotangent.

count

Return the number of non-null elements in the column.

cum_count

Return the cumulative count of the non-null values in the column.

cum_max

Get an array with the cumulative max computed at every element.

cum_min

Get an array with the cumulative min computed at every element.

cum_prod

Get an array with the cumulative product computed at every element.

cum_sum

Get an array with the cumulative sum computed at every element.

cumulative_eval

Run an expression over a sliding window that increases 1 slot every iteration.

cut

Bin continuous values into discrete categories.

degrees

Convert from radians to degrees.

deserialize

Read a serialized expression from a file.

diff

Calculate the first discrete difference between shifted items.

dot

Compute the dot/inner product between two Expressions.

drop_nans

Drop all floating point NaN values.

drop_nulls

Drop all null values.

entropy

Computes the entropy.

eq

Method equivalent of equality operator expr == other.

eq_missing

Method equivalent of equality operator expr == other where None == None.

ewm_mean

Exponentially-weighted moving average.

ewm_mean_by

Calculate time-based exponentially weighted moving average.

ewm_std

Exponentially-weighted moving standard deviation.

ewm_var

Exponentially-weighted moving variance.

exclude

Exclude columns from a multi-column expression.

exp

Compute the exponential, element-wise.

explode

Explode a list expression.

extend_constant

Extremely fast method for extending the Series with 'n' copies of a value.

fill_nan

Fill floating point NaN value with a fill value.

fill_null

Fill null values using the specified value or strategy.

filter

Filter the expression based on one or more predicate expressions.

first

Get the first value.

flatten

Flatten a list or string column.

floor

Rounds down to the nearest integer value.

floordiv

Method equivalent of integer division operator expr // other.

forward_fill

Fill missing values with the latest seen values.

from_json

Read an expression from a JSON encoded string to construct an Expression.

gather

Take values by index.

gather_every

Take every nth value in the Series and return as a new Series.

ge

Method equivalent of "greater than or equal" operator expr >= other.

get

Return a single value by index.

gt

Method equivalent of "greater than" operator expr > other.

has_nulls

Check whether the expression contains one or more null values.

hash

Hash the elements in the selection.

head

Get the first n rows.

hist

Bin values into buckets and count their occurrences.

implode

Aggregate values into a list.

inspect

Print the value that this expression evaluates to and pass on the value.

interpolate

Fill null values using interpolation.

interpolate_by

Fill null values using interpolation based on another column.

is_between

Check if this expression is between the given lower and upper bounds.

is_duplicated

Return a boolean mask indicating duplicated values.

is_finite

Returns a boolean Series indicating which values are finite.

is_first_distinct

Return a boolean mask indicating the first occurrence of each distinct value.

is_in

Check if elements of this expression are present in the other Series.

is_infinite

Returns a boolean Series indicating which values are infinite.

is_last_distinct

Return a boolean mask indicating the last occurrence of each distinct value.

is_nan

Returns a boolean Series indicating which values are NaN.

is_not_nan

Returns a boolean Series indicating which values are not NaN.

is_not_null

Returns a boolean Series indicating which values are not null.

is_null

Returns a boolean Series indicating which values are null.

is_unique

Get mask of unique values.

kurtosis

Compute the kurtosis (Fisher or Pearson) of a dataset.

last

Get the last value.

le

Method equivalent of "less than or equal" operator expr <= other.

len

Return the number of elements in the column.

limit

Get the first n rows (alias for Expr.head()).

log

Compute the logarithm to a given base.

log10

Compute the base 10 logarithm of the input array, element-wise.

log1p

Compute the natural logarithm of each element plus one.

lower_bound

Calculate the lower bound.

lt

Method equivalent of "less than" operator expr < other.

map_batches

Apply a custom python function to a whole Series or sequence of Series.

map_elements

Map a custom/user-defined function (UDF) to each element of a column.

max

Get maximum value.

mean

Get mean value.

median

Get median value using linear interpolation.

min

Get minimum value.

mod

Method equivalent of modulus operator expr % other.

mode

Compute the most occurring value(s).

mul

Method equivalent of multiplication operator expr * other.

n_unique

Count unique values.

nan_max

Get maximum value, but propagate/poison encountered NaN values.

nan_min

Get minimum value, but propagate/poison encountered NaN values.

ne

Method equivalent of inequality operator expr != other.

ne_missing

Method equivalent of equality operator expr != other where None == None.

neg

Method equivalent of unary minus operator -expr.

not_

Negate a boolean expression.

null_count

Count null values.

or_

Method equivalent of bitwise "or" operator expr | other | ....

over

Compute expressions over the given groups.

pct_change

Computes percentage change between values.

peak_max

Get a boolean mask of the local maximum peaks.

peak_min

Get a boolean mask of the local minimum peaks.

pipe

Offers a structured way to apply a sequence of user-defined functions (UDFs).

pow

Method equivalent of exponentiation operator expr ** exponent.

product

Compute the product of an expression.

qcut

Bin continuous values into discrete categories based on their quantiles.

quantile

Get quantile value.

radians

Convert from degrees to radians.

rank

Assign ranks to data, dealing with ties appropriately.

rechunk

Create a single chunk of memory for this Series.

register_plugin

Register a plugin function.

reinterpret

Reinterpret the underlying bits as a signed/unsigned integer.

repeat_by

Repeat the elements in this Series as specified in the given expression.

replace

Replace values by different values.

reshape

Reshape this Expr to a flat column or an Array column.

reverse

Reverse the selection.

rle

Compress the column data using run-length encoding.

rle_id

Get a distinct integer ID for each run of identical values.

rolling

Create rolling groups based on a temporal or integer column.

rolling_map

Compute a custom rolling window function.

rolling_max

Apply a rolling max (moving max) over the values in this array.

rolling_max_by

Apply a rolling max based on another column.

rolling_mean

Apply a rolling mean (moving mean) over the values in this array.

rolling_mean_by

Apply a rolling mean based on another column.

rolling_median

Compute a rolling median.

rolling_median_by

Compute a rolling median based on another column.

rolling_min

Apply a rolling min (moving min) over the values in this array.

rolling_min_by

Apply a rolling min based on another column.

rolling_quantile

Compute a rolling quantile.

rolling_quantile_by

Compute a rolling quantile based on another column.

rolling_skew

Compute a rolling skew.

rolling_std

Compute a rolling standard deviation.

rolling_std_by

Compute a rolling standard deviation based on another column.

rolling_sum

Apply a rolling sum (moving sum) over the values in this array.

rolling_sum_by

Apply a rolling sum based on another column.

rolling_var

Compute a rolling variance.

rolling_var_by

Compute a rolling variance based on another column.

round

Round underlying floating point data by decimals digits.

round_sig_figs

Round to a number of significant figures.

sample

Sample from this expression.

search_sorted

Find indices where elements should be inserted to maintain order.

set_sorted

Flags the expression as 'sorted'.

shift

Shift values by the given number of indices.

shrink_dtype

Shrink numeric columns to the minimal required datatype.

shuffle

Shuffle the contents of this expression.

sign

Compute the element-wise indication of the sign.

sin

Compute the element-wise value for the sine.

sinh

Compute the element-wise value for the hyperbolic sine.

skew

Compute the sample skewness of a data set.

slice

Get a slice of this expression.

sort

Sort this column.

sort_by

Sort this column by the ordering of other columns.

sqrt

Compute the square root of the elements.

std

Get standard deviation.

sub

Method equivalent of subtraction operator expr - other.

sum

Get sum value.

tail

Get the last n rows.

tan

Compute the element-wise value for the tangent.

tanh

Compute the element-wise value for the hyperbolic tangent.

to_physical

Cast to physical representation of the logical dtype.

top_k

Return the k largest elements.

top_k_by

Return the elements corresponding to the k largest elements of the by column(s).

truediv

Method equivalent of float division operator expr / other.

unique

Get unique values of this expression.

unique_counts

Return a count of the unique values in the order of appearance.

upper_bound

Calculate the upper bound.

value_counts

Count the occurrences of unique values.

var

Get variance.

where

Filter a single column.

xor

Method equivalent of bitwise exclusive-or operator expr ^ other.

abs() Self[source]

Compute absolute values.

Same as abs(expr).

Examples

>>> df = pl.DataFrame(
...     {
...         "A": [-1.0, 0.0, 1.0, 2.0],
...     }
... )
>>> df.select(pl.col("A").abs())
shape: (4, 1)
┌─────┐
│ A   │
│ --- │
│ f64 │
╞═════╡
│ 1.0 │
│ 0.0 │
│ 1.0 │
│ 2.0 │
└─────┘
add(other: Any) Self[source]

Method equivalent of addition operator expr + other.

Parameters:
other

numeric or string value; accepts expression input.

Examples

>>> df = pl.DataFrame({"x": [1, 2, 3, 4, 5]})
>>> df.with_columns(
...     pl.col("x").add(2).alias("x+int"),
...     pl.col("x").add(pl.col("x").cum_prod()).alias("x+expr"),
... )
shape: (5, 3)
┌─────┬───────┬────────┐
│ x   ┆ x+int ┆ x+expr │
│ --- ┆ ---   ┆ ---    │
│ i64 ┆ i64   ┆ i64    │
╞═════╪═══════╪════════╡
│ 1   ┆ 3     ┆ 2      │
│ 2   ┆ 4     ┆ 4      │
│ 3   ┆ 5     ┆ 9      │
│ 4   ┆ 6     ┆ 28     │
│ 5   ┆ 7     ┆ 125    │
└─────┴───────┴────────┘
>>> df = pl.DataFrame(
...     {"x": ["a", "d", "g"], "y": ["b", "e", "h"], "z": ["c", "f", "i"]}
... )
>>> df.with_columns(pl.col("x").add(pl.col("y")).add(pl.col("z")).alias("xyz"))
shape: (3, 4)
┌─────┬─────┬─────┬─────┐
│ x   ┆ y   ┆ z   ┆ xyz │
│ --- ┆ --- ┆ --- ┆ --- │
│ str ┆ str ┆ str ┆ str │
╞═════╪═════╪═════╪═════╡
│ a   ┆ b   ┆ c   ┆ abc │
│ d   ┆ e   ┆ f   ┆ def │
│ g   ┆ h   ┆ i   ┆ ghi │
└─────┴─────┴─────┴─────┘
agg_groups() Self[source]

Get the group indexes of the group by operation.

Should be used in aggregation context only.

Examples

>>> df = pl.DataFrame(
...     {
...         "group": [
...             "one",
...             "one",
...             "one",
...             "two",
...             "two",
...             "two",
...         ],
...         "value": [94, 95, 96, 97, 97, 99],
...     }
... )
>>> df.group_by("group", maintain_order=True).agg(pl.col("value").agg_groups())
shape: (2, 2)
┌───────┬───────────┐
│ group ┆ value     │
│ ---   ┆ ---       │
│ str   ┆ list[u32] │
╞═══════╪═══════════╡
│ one   ┆ [0, 1, 2] │
│ two   ┆ [3, 4, 5] │
└───────┴───────────┘
alias(name: str) Self[source]

Rename the expression.

Parameters:
name

The new name.

See also

map
prefix
suffix

Examples

Rename an expression to avoid overwriting an existing column.

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, 3],
...         "b": ["x", "y", "z"],
...     }
... )
>>> df.with_columns(
...     pl.col("a") + 10,
...     pl.col("b").str.to_uppercase().alias("c"),
... )
shape: (3, 3)
┌─────┬─────┬─────┐
│ a   ┆ b   ┆ c   │
│ --- ┆ --- ┆ --- │
│ i64 ┆ str ┆ str │
╞═════╪═════╪═════╡
│ 11  ┆ x   ┆ X   │
│ 12  ┆ y   ┆ Y   │
│ 13  ┆ z   ┆ Z   │
└─────┴─────┴─────┘

Overwrite the default name of literal columns to prevent errors due to duplicate column names.

>>> df.with_columns(
...     pl.lit(True).alias("c"),
...     pl.lit(4.0).alias("d"),
... )
shape: (3, 4)
┌─────┬─────┬──────┬─────┐
│ a   ┆ b   ┆ c    ┆ d   │
│ --- ┆ --- ┆ ---  ┆ --- │
│ i64 ┆ str ┆ bool ┆ f64 │
╞═════╪═════╪══════╪═════╡
│ 1   ┆ x   ┆ true ┆ 4.0 │
│ 2   ┆ y   ┆ true ┆ 4.0 │
│ 3   ┆ z   ┆ true ┆ 4.0 │
└─────┴─────┴──────┴─────┘
all(*, ignore_nulls: bool = True) Self[source]

Return whether all values in the column are True.

Only works on columns of data type Boolean.

Note

This method is not to be confused with the function polars.all(), which can be used to select all columns.

Parameters:
ignore_nulls

Ignore null values (default).

If set to False, Kleene logic is used to deal with nulls: if the column contains any null values and no True values, the output is null.

Returns:
Expr

Expression of data type Boolean.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [True, True],
...         "b": [False, True],
...         "c": [None, True],
...     }
... )
>>> df.select(pl.col("*").all())
shape: (1, 3)
┌──────┬───────┬──────┐
│ a    ┆ b     ┆ c    │
│ ---  ┆ ---   ┆ ---  │
│ bool ┆ bool  ┆ bool │
╞══════╪═══════╪══════╡
│ true ┆ false ┆ true │
└──────┴───────┴──────┘

Enable Kleene logic by setting ignore_nulls=False.

>>> df.select(pl.col("*").all(ignore_nulls=False))
shape: (1, 3)
┌──────┬───────┬──────┐
│ a    ┆ b     ┆ c    │
│ ---  ┆ ---   ┆ ---  │
│ bool ┆ bool  ┆ bool │
╞══════╪═══════╪══════╡
│ true ┆ false ┆ null │
└──────┴───────┴──────┘
and_(*others: Any) Self[source]

Method equivalent of bitwise “and” operator expr & other & ....

Parameters:
*others

One or more integer or boolean expressions to evaluate/combine.

Examples

>>> df = pl.DataFrame(
...     data={
...         "x": [5, 6, 7, 4, 8],
...         "y": [1.5, 2.5, 1.0, 4.0, -5.75],
...         "z": [-9, 2, -1, 4, 8],
...     }
... )
>>> df.select(
...     (pl.col("x") >= pl.col("z"))
...     .and_(
...         pl.col("y") >= pl.col("z"),
...         pl.col("y") == pl.col("y"),
...         pl.col("z") <= pl.col("x"),
...         pl.col("y") != pl.col("x"),
...     )
...     .alias("all")
... )
shape: (5, 1)
┌───────┐
│ all   │
│ ---   │
│ bool  │
╞═══════╡
│ true  │
│ true  │
│ true  │
│ false │
│ false │
└───────┘
any(*, ignore_nulls: bool = True) Self[source]

Return whether any of the values in the column are True.

Only works on columns of data type Boolean.

Parameters:
ignore_nulls

Ignore null values (default).

If set to False, Kleene logic is used to deal with nulls: if the column contains any null values and no True values, the output is null.

Returns:
Expr

Expression of data type Boolean.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [True, False],
...         "b": [False, False],
...         "c": [None, False],
...     }
... )
>>> df.select(pl.col("*").any())
shape: (1, 3)
┌──────┬───────┬───────┐
│ a    ┆ b     ┆ c     │
│ ---  ┆ ---   ┆ ---   │
│ bool ┆ bool  ┆ bool  │
╞══════╪═══════╪═══════╡
│ true ┆ false ┆ false │
└──────┴───────┴───────┘

Enable Kleene logic by setting ignore_nulls=False.

>>> df.select(pl.col("*").any(ignore_nulls=False))
shape: (1, 3)
┌──────┬───────┬──────┐
│ a    ┆ b     ┆ c    │
│ ---  ┆ ---   ┆ ---  │
│ bool ┆ bool  ┆ bool │
╞══════╪═══════╪══════╡
│ true ┆ false ┆ null │
└──────┴───────┴──────┘
append(other: IntoExpr, *, upcast: bool = True) Self[source]

Append expressions.

This is done by adding the chunks of other to this Series.

Parameters:
other

Expression to append.

upcast

Cast both Series to the same supertype.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [8, 9, 10],
...         "b": [None, 4, 4],
...     }
... )
>>> df.select(pl.all().head(1).append(pl.all().tail(1)))
shape: (2, 2)
┌─────┬──────┐
│ a   ┆ b    │
│ --- ┆ ---  │
│ i64 ┆ i64  │
╞═════╪══════╡
│ 8   ┆ null │
│ 10  ┆ 4    │
└─────┴──────┘
approx_n_unique() Self[source]

Approximate count of unique values.

This is done using the HyperLogLog++ algorithm for cardinality estimation.

Examples

>>> df = pl.DataFrame({"n": [1, 1, 2]})
>>> df.select(pl.col("n").approx_n_unique())
shape: (1, 1)
┌─────┐
│ n   │
│ --- │
│ u32 │
╞═════╡
│ 2   │
└─────┘
>>> df = pl.DataFrame({"n": range(1000)})
>>> df.select(
...     exact=pl.col("n").n_unique(),
...     approx=pl.col("n").approx_n_unique(),
... )  
shape: (1, 2)
┌───────┬────────┐
│ exact ┆ approx │
│ ---   ┆ ---    │
│ u32   ┆ u32    │
╞═══════╪════════╡
│ 1000  ┆ 1005   │
└───────┴────────┘
arccos() Self[source]

Compute the element-wise value for the inverse cosine.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [0.0]})
>>> df.select(pl.col("a").arccos())
shape: (1, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 1.570796 │
└──────────┘
arccosh() Self[source]

Compute the element-wise value for the inverse hyperbolic cosine.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [1.0]})
>>> df.select(pl.col("a").arccosh())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 0.0 │
└─────┘
arcsin() Self[source]

Compute the element-wise value for the inverse sine.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [1.0]})
>>> df.select(pl.col("a").arcsin())
shape: (1, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 1.570796 │
└──────────┘
arcsinh() Self[source]

Compute the element-wise value for the inverse hyperbolic sine.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [1.0]})
>>> df.select(pl.col("a").arcsinh())
shape: (1, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 0.881374 │
└──────────┘
arctan() Self[source]

Compute the element-wise value for the inverse tangent.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [1.0]})
>>> df.select(pl.col("a").arctan())
shape: (1, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 0.785398 │
└──────────┘
arctanh() Self[source]

Compute the element-wise value for the inverse hyperbolic tangent.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [1.0]})
>>> df.select(pl.col("a").arctanh())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ inf │
└─────┘
arg_max() Self[source]

Get the index of the maximal value.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [20, 10, 30],
...     }
... )
>>> df.select(pl.col("a").arg_max())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ u32 │
╞═════╡
│ 2   │
└─────┘
arg_min() Self[source]

Get the index of the minimal value.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [20, 10, 30],
...     }
... )
>>> df.select(pl.col("a").arg_min())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ u32 │
╞═════╡
│ 1   │
└─────┘
arg_sort(*, descending: bool = False, nulls_last: bool = False) Self[source]

Get the index values that would sort this column.

Parameters:
descending

Sort in descending (descending) order.

nulls_last

Place null values last instead of first.

Returns:
Expr

Expression of data type UInt32.

See also

Expr.gather

Take values by index.

Expr.rank

Get the rank of each row.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [20, 10, 30],
...         "b": [1, 2, 3],
...     }
... )
>>> df.select(pl.col("a").arg_sort())
shape: (3, 1)
┌─────┐
│ a   │
│ --- │
│ u32 │
╞═════╡
│ 1   │
│ 0   │
│ 2   │
└─────┘

Use gather to apply the arg sort to other columns.

>>> df.select(pl.col("b").gather(pl.col("a").arg_sort()))
shape: (3, 1)
┌─────┐
│ b   │
│ --- │
│ i64 │
╞═════╡
│ 2   │
│ 1   │
│ 3   │
└─────┘
arg_true() Self[source]

Return indices where expression evaluates True.

Warning

Modifies number of rows returned, so will fail in combination with other expressions. Use as only expression in select / with_columns.

See also

Series.arg_true

Return indices where Series is True

polars.arg_where

Examples

>>> df = pl.DataFrame({"a": [1, 1, 2, 1]})
>>> df.select((pl.col("a") == 1).arg_true())
shape: (3, 1)
┌─────┐
│ a   │
│ --- │
│ u32 │
╞═════╡
│ 0   │
│ 1   │
│ 3   │
└─────┘
arg_unique() Self[source]

Get index of first unique value.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [8, 9, 10],
...         "b": [None, 4, 4],
...     }
... )
>>> df.select(pl.col("a").arg_unique())
shape: (3, 1)
┌─────┐
│ a   │
│ --- │
│ u32 │
╞═════╡
│ 0   │
│ 1   │
│ 2   │
└─────┘
>>> df.select(pl.col("b").arg_unique())
shape: (2, 1)
┌─────┐
│ b   │
│ --- │
│ u32 │
╞═════╡
│ 0   │
│ 1   │
└─────┘
backward_fill(limit: int | None = None) Self[source]

Fill missing values with the next to be seen values.

Parameters:
limit

The number of consecutive null values to backward fill.

See also

forward_fill
shift

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, None],
...         "b": [4, None, 6],
...         "c": [None, None, 2],
...     }
... )
>>> df.select(pl.all().backward_fill())
shape: (3, 3)
┌──────┬─────┬─────┐
│ a    ┆ b   ┆ c   │
│ ---  ┆ --- ┆ --- │
│ i64  ┆ i64 ┆ i64 │
╞══════╪═════╪═════╡
│ 1    ┆ 4   ┆ 2   │
│ 2    ┆ 6   ┆ 2   │
│ null ┆ 6   ┆ 2   │
└──────┴─────┴─────┘
>>> df.select(pl.all().backward_fill(limit=1))
shape: (3, 3)
┌──────┬─────┬──────┐
│ a    ┆ b   ┆ c    │
│ ---  ┆ --- ┆ ---  │
│ i64  ┆ i64 ┆ i64  │
╞══════╪═════╪══════╡
│ 1    ┆ 4   ┆ null │
│ 2    ┆ 6   ┆ 2    │
│ null ┆ 6   ┆ 2    │
└──────┴─────┴──────┘
bottom_k(k: int | IntoExprColumn = 5) Self[source]

Return the k smallest elements.

Non-null elements are always preferred over null elements. The output is not guaranteed to be in any particular order, call sort() after this function if you wish the output to be sorted.

This has time complexity:

\[O(n)\]
Parameters:
k

Number of elements to return.

Examples

>>> df = pl.DataFrame(
...     {
...         "value": [1, 98, 2, 3, 99, 4],
...     }
... )
>>> df.select(
...     pl.col("value").top_k().alias("top_k"),
...     pl.col("value").bottom_k().alias("bottom_k"),
... )
shape: (5, 2)
┌───────┬──────────┐
│ top_k ┆ bottom_k │
│ ---   ┆ ---      │
│ i64   ┆ i64      │
╞═══════╪══════════╡
│ 4     ┆ 1        │
│ 98    ┆ 98       │
│ 2     ┆ 2        │
│ 3     ┆ 3        │
│ 99    ┆ 4        │
└───────┴──────────┘
bottom_k_by(
by: IntoExpr | Iterable[IntoExpr],
k: int | IntoExprColumn = 5,
*,
reverse: bool | Sequence[bool] = False,
) Self[source]

Return the elements corresponding to the k smallest elements of the by column(s).

Non-null elements are always preferred over null elements, regardless of the value of reverse. The output is not guaranteed to be in any particular order, call sort() after this function if you wish the output to be sorted.

This has time complexity:

\[O(n \log{n})\]
Parameters:
by

Column(s) used to determine the smallest elements. Accepts expression input. Strings are parsed as column names.

k

Number of elements to return.

reverse

Consider the k largest elements of the by column(s) (instead of the k smallest). This can be specified per column by passing a sequence of booleans.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, 3, 4, 5, 6],
...         "b": [6, 5, 4, 3, 2, 1],
...         "c": ["Apple", "Orange", "Apple", "Apple", "Banana", "Banana"],
...     }
... )
>>> df
shape: (6, 3)
┌─────┬─────┬────────┐
│ a   ┆ b   ┆ c      │
│ --- ┆ --- ┆ ---    │
│ i64 ┆ i64 ┆ str    │
╞═════╪═════╪════════╡
│ 1   ┆ 6   ┆ Apple  │
│ 2   ┆ 5   ┆ Orange │
│ 3   ┆ 4   ┆ Apple  │
│ 4   ┆ 3   ┆ Apple  │
│ 5   ┆ 2   ┆ Banana │
│ 6   ┆ 1   ┆ Banana │
└─────┴─────┴────────┘

Get the bottom 2 rows by column a or b.

>>> df.select(
...     pl.all().bottom_k_by("a", 2).name.suffix("_btm_by_a"),
...     pl.all().bottom_k_by("b", 2).name.suffix("_btm_by_b"),
... )
shape: (2, 6)
┌────────────┬────────────┬────────────┬────────────┬────────────┬────────────┐
│ a_btm_by_a ┆ b_btm_by_a ┆ c_btm_by_a ┆ a_btm_by_b ┆ b_btm_by_b ┆ c_btm_by_b │
│ ---        ┆ ---        ┆ ---        ┆ ---        ┆ ---        ┆ ---        │
│ i64        ┆ i64        ┆ str        ┆ i64        ┆ i64        ┆ str        │
╞════════════╪════════════╪════════════╪════════════╪════════════╪════════════╡
│ 1          ┆ 6          ┆ Apple      ┆ 6          ┆ 1          ┆ Banana     │
│ 2          ┆ 5          ┆ Orange     ┆ 5          ┆ 2          ┆ Banana     │
└────────────┴────────────┴────────────┴────────────┴────────────┴────────────┘

Get the bottom 2 rows by multiple columns with given order.

>>> df.select(
...     pl.all()
...     .bottom_k_by(["c", "a"], 2, reverse=[False, True])
...     .name.suffix("_by_ca"),
...     pl.all()
...     .bottom_k_by(["c", "b"], 2, reverse=[False, True])
...     .name.suffix("_by_cb"),
... )
shape: (2, 6)
┌─────────┬─────────┬─────────┬─────────┬─────────┬─────────┐
│ a_by_ca ┆ b_by_ca ┆ c_by_ca ┆ a_by_cb ┆ b_by_cb ┆ c_by_cb │
│ ---     ┆ ---     ┆ ---     ┆ ---     ┆ ---     ┆ ---     │
│ i64     ┆ i64     ┆ str     ┆ i64     ┆ i64     ┆ str     │
╞═════════╪═════════╪═════════╪═════════╪═════════╪═════════╡
│ 4       ┆ 3       ┆ Apple   ┆ 1       ┆ 6       ┆ Apple   │
│ 3       ┆ 4       ┆ Apple   ┆ 3       ┆ 4       ┆ Apple   │
└─────────┴─────────┴─────────┴─────────┴─────────┴─────────┘

Get the bottom 2 rows by column a in each group.

>>> (
...     df.group_by("c", maintain_order=True)
...     .agg(pl.all().bottom_k_by("a", 2))
...     .explode(pl.all().exclude("c"))
... )
shape: (5, 3)
┌────────┬─────┬─────┐
│ c      ┆ a   ┆ b   │
│ ---    ┆ --- ┆ --- │
│ str    ┆ i64 ┆ i64 │
╞════════╪═════╪═════╡
│ Apple  ┆ 1   ┆ 6   │
│ Apple  ┆ 3   ┆ 4   │
│ Orange ┆ 2   ┆ 5   │
│ Banana ┆ 5   ┆ 2   │
│ Banana ┆ 6   ┆ 1   │
└────────┴─────┴─────┘
cast(
dtype: PolarsDataType | type[Any],
*,
strict: bool = True,
wrap_numerical: bool = False,
) Self[source]

Cast between data types.

Parameters:
dtype

DataType to cast to.

strict

If True invalid casts generate exceptions instead of nulls.

wrap_numerical

If True numeric casts wrap overflowing values instead of marking the cast as invalid.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, 3],
...         "b": ["4", "5", "6"],
...     }
... )
>>> df.with_columns(
...     pl.col("a").cast(pl.Float64),
...     pl.col("b").cast(pl.Int32),
... )
shape: (3, 2)
┌─────┬─────┐
│ a   ┆ b   │
│ --- ┆ --- │
│ f64 ┆ i32 │
╞═════╪═════╡
│ 1.0 ┆ 4   │
│ 2.0 ┆ 5   │
│ 3.0 ┆ 6   │
└─────┴─────┘
cbrt() Self[source]

Compute the cube root of the elements.

Examples

>>> df = pl.DataFrame({"values": [1.0, 2.0, 4.0]})
>>> df.select(pl.col("values").cbrt())
shape: (3, 1)
┌──────────┐
│ values   │
│ ---      │
│ f64      │
╞══════════╡
│ 1.0      │
│ 1.259921 │
│ 1.587401 │
└──────────┘
ceil() Self[source]

Rounds up to the nearest integer value.

Only works on floating point Series.

Examples

>>> df = pl.DataFrame({"a": [0.3, 0.5, 1.0, 1.1]})
>>> df.select(pl.col("a").ceil())
shape: (4, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 1.0 │
│ 1.0 │
│ 1.0 │
│ 2.0 │
└─────┘
clip(
lower_bound: NumericLiteral | TemporalLiteral | IntoExprColumn | None = None,
upper_bound: NumericLiteral | TemporalLiteral | IntoExprColumn | None = None,
) Self[source]

Set values outside the given boundaries to the boundary value.

Parameters:
lower_bound

Lower bound. Accepts expression input. Non-expression inputs are parsed as literals.

upper_bound

Upper bound. Accepts expression input. Non-expression inputs are parsed as literals.

See also

when

Notes

This method only works for numeric and temporal columns. To clip other data types, consider writing a when-then-otherwise expression. See when().

Examples

Specifying both a lower and upper bound:

>>> df = pl.DataFrame({"a": [-50, 5, 50, None]})
>>> df.with_columns(clip=pl.col("a").clip(1, 10))
shape: (4, 2)
┌──────┬──────┐
│ a    ┆ clip │
│ ---  ┆ ---  │
│ i64  ┆ i64  │
╞══════╪══════╡
│ -50  ┆ 1    │
│ 5    ┆ 5    │
│ 50   ┆ 10   │
│ null ┆ null │
└──────┴──────┘

Specifying only a single bound:

>>> df.with_columns(clip=pl.col("a").clip(upper_bound=10))
shape: (4, 2)
┌──────┬──────┐
│ a    ┆ clip │
│ ---  ┆ ---  │
│ i64  ┆ i64  │
╞══════╪══════╡
│ -50  ┆ -50  │
│ 5    ┆ 5    │
│ 50   ┆ 10   │
│ null ┆ null │
└──────┴──────┘
cos() Self[source]

Compute the element-wise value for the cosine.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [0.0]})
>>> df.select(pl.col("a").cos())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 1.0 │
└─────┘
cosh() Self[source]

Compute the element-wise value for the hyperbolic cosine.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [1.0]})
>>> df.select(pl.col("a").cosh())
shape: (1, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 1.543081 │
└──────────┘
cot() Self[source]

Compute the element-wise value for the cotangent.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [1.0]})
>>> df.select(pl.col("a").cot().round(2))
shape: (1, 1)
┌──────┐
│ a    │
│ ---  │
│ f64  │
╞══════╡
│ 0.64 │
└──────┘
count() Self[source]

Return the number of non-null elements in the column.

Returns:
Expr

Expression of data type UInt32.

See also

len

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3], "b": [None, 4, 4]})
>>> df.select(pl.all().count())
shape: (1, 2)
┌─────┬─────┐
│ a   ┆ b   │
│ --- ┆ --- │
│ u32 ┆ u32 │
╞═════╪═════╡
│ 3   ┆ 2   │
└─────┴─────┘
cum_count(*, reverse: bool = False) Self[source]

Return the cumulative count of the non-null values in the column.

Parameters:
reverse

Reverse the operation.

Examples

>>> df = pl.DataFrame({"a": ["x", "k", None, "d"]})
>>> df.with_columns(
...     pl.col("a").cum_count().alias("cum_count"),
...     pl.col("a").cum_count(reverse=True).alias("cum_count_reverse"),
... )
shape: (4, 3)
┌──────┬───────────┬───────────────────┐
│ a    ┆ cum_count ┆ cum_count_reverse │
│ ---  ┆ ---       ┆ ---               │
│ str  ┆ u32       ┆ u32               │
╞══════╪═══════════╪═══════════════════╡
│ x    ┆ 1         ┆ 3                 │
│ k    ┆ 2         ┆ 2                 │
│ null ┆ 2         ┆ 1                 │
│ d    ┆ 3         ┆ 1                 │
└──────┴───────────┴───────────────────┘
cum_max(*, reverse: bool = False) Self[source]

Get an array with the cumulative max computed at every element.

Parameters:
reverse

Reverse the operation.

Examples

>>> df = pl.DataFrame({"a": [1, 3, 2]})
>>> df.with_columns(
...     pl.col("a").cum_max().alias("cum_max"),
...     pl.col("a").cum_max(reverse=True).alias("cum_max_reverse"),
... )
shape: (3, 3)
┌─────┬─────────┬─────────────────┐
│ a   ┆ cum_max ┆ cum_max_reverse │
│ --- ┆ ---     ┆ ---             │
│ i64 ┆ i64     ┆ i64             │
╞═════╪═════════╪═════════════════╡
│ 1   ┆ 1       ┆ 3               │
│ 3   ┆ 3       ┆ 3               │
│ 2   ┆ 3       ┆ 2               │
└─────┴─────────┴─────────────────┘

Null values are excluded, but can also be filled by calling forward_fill.

>>> df = pl.DataFrame({"values": [None, 10, None, 8, 9, None, 16, None]})
>>> df.with_columns(
...     pl.col("values").cum_max().alias("cum_max"),
...     pl.col("values").cum_max().forward_fill().alias("cum_max_all_filled"),
... )
shape: (8, 3)
┌────────┬─────────┬────────────────────┐
│ values ┆ cum_max ┆ cum_max_all_filled │
│ ---    ┆ ---     ┆ ---                │
│ i64    ┆ i64     ┆ i64                │
╞════════╪═════════╪════════════════════╡
│ null   ┆ null    ┆ null               │
│ 10     ┆ 10      ┆ 10                 │
│ null   ┆ null    ┆ 10                 │
│ 8      ┆ 10      ┆ 10                 │
│ 9      ┆ 10      ┆ 10                 │
│ null   ┆ null    ┆ 10                 │
│ 16     ┆ 16      ┆ 16                 │
│ null   ┆ null    ┆ 16                 │
└────────┴─────────┴────────────────────┘
cum_min(*, reverse: bool = False) Self[source]

Get an array with the cumulative min computed at every element.

Parameters:
reverse

Reverse the operation.

Examples

>>> df = pl.DataFrame({"a": [3, 1, 2]})
>>> df.with_columns(
...     pl.col("a").cum_min().alias("cum_min"),
...     pl.col("a").cum_min(reverse=True).alias("cum_min_reverse"),
... )
shape: (3, 3)
┌─────┬─────────┬─────────────────┐
│ a   ┆ cum_min ┆ cum_min_reverse │
│ --- ┆ ---     ┆ ---             │
│ i64 ┆ i64     ┆ i64             │
╞═════╪═════════╪═════════════════╡
│ 3   ┆ 3       ┆ 1               │
│ 1   ┆ 1       ┆ 1               │
│ 2   ┆ 1       ┆ 2               │
└─────┴─────────┴─────────────────┘
cum_prod(*, reverse: bool = False) Self[source]

Get an array with the cumulative product computed at every element.

Parameters:
reverse

Reverse the operation.

Notes

Dtypes in {Int8, UInt8, Int16, UInt16} are cast to Int64 before summing to prevent overflow issues.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3, 4]})
>>> df.with_columns(
...     pl.col("a").cum_prod().alias("cum_prod"),
...     pl.col("a").cum_prod(reverse=True).alias("cum_prod_reverse"),
... )
shape: (4, 3)
┌─────┬──────────┬──────────────────┐
│ a   ┆ cum_prod ┆ cum_prod_reverse │
│ --- ┆ ---      ┆ ---              │
│ i64 ┆ i64      ┆ i64              │
╞═════╪══════════╪══════════════════╡
│ 1   ┆ 1        ┆ 24               │
│ 2   ┆ 2        ┆ 24               │
│ 3   ┆ 6        ┆ 12               │
│ 4   ┆ 24       ┆ 4                │
└─────┴──────────┴──────────────────┘
cum_sum(*, reverse: bool = False) Self[source]

Get an array with the cumulative sum computed at every element.

Parameters:
reverse

Reverse the operation.

Notes

Dtypes in {Int8, UInt8, Int16, UInt16} are cast to Int64 before summing to prevent overflow issues.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3, 4]})
>>> df.with_columns(
...     pl.col("a").cum_sum().alias("cum_sum"),
...     pl.col("a").cum_sum(reverse=True).alias("cum_sum_reverse"),
... )
shape: (4, 3)
┌─────┬─────────┬─────────────────┐
│ a   ┆ cum_sum ┆ cum_sum_reverse │
│ --- ┆ ---     ┆ ---             │
│ i64 ┆ i64     ┆ i64             │
╞═════╪═════════╪═════════════════╡
│ 1   ┆ 1       ┆ 10              │
│ 2   ┆ 3       ┆ 9               │
│ 3   ┆ 6       ┆ 7               │
│ 4   ┆ 10      ┆ 4               │
└─────┴─────────┴─────────────────┘

Null values are excluded, but can also be filled by calling forward_fill.

>>> df = pl.DataFrame({"values": [None, 10, None, 8, 9, None, 16, None]})
>>> df.with_columns(
...     pl.col("values").cum_sum().alias("value_cum_sum"),
...     pl.col("values")
...     .cum_sum()
...     .forward_fill()
...     .alias("value_cum_sum_all_filled"),
... )
shape: (8, 3)
┌────────┬───────────────┬──────────────────────────┐
│ values ┆ value_cum_sum ┆ value_cum_sum_all_filled │
│ ---    ┆ ---           ┆ ---                      │
│ i64    ┆ i64           ┆ i64                      │
╞════════╪═══════════════╪══════════════════════════╡
│ null   ┆ null          ┆ null                     │
│ 10     ┆ 10            ┆ 10                       │
│ null   ┆ null          ┆ 10                       │
│ 8      ┆ 18            ┆ 18                       │
│ 9      ┆ 27            ┆ 27                       │
│ null   ┆ null          ┆ 27                       │
│ 16     ┆ 43            ┆ 43                       │
│ null   ┆ null          ┆ 43                       │
└────────┴───────────────┴──────────────────────────┘
cumulative_eval(
expr: Expr,
*,
min_periods: int = 1,
parallel: bool = False,
) Self[source]

Run an expression over a sliding window that increases 1 slot every iteration.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Parameters:
expr

Expression to evaluate

min_periods

Number of valid values there should be in the window before the expression is evaluated. valid values = length - null_count

parallel

Run in parallel. Don’t do this in a group by or another operation that already has much parallelization.

Warning

This can be really slow as it can have O(n^2) complexity. Don’t use this for operations that visit all elements.

Examples

>>> df = pl.DataFrame({"values": [1, 2, 3, 4, 5]})
>>> df.select(
...     [
...         pl.col("values").cumulative_eval(
...             pl.element().first() - pl.element().last() ** 2
...         )
...     ]
... )
shape: (5, 1)
┌────────┐
│ values │
│ ---    │
│ i64    │
╞════════╡
│ 0      │
│ -3     │
│ -8     │
│ -15    │
│ -24    │
└────────┘
cut(
breaks: Sequence[float],
*,
labels: Sequence[str] | None = None,
left_closed: bool = False,
include_breaks: bool = False,
) Self[source]

Bin continuous values into discrete categories.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Parameters:
breaks

List of unique cut points.

labels

Names of the categories. The number of labels must be equal to the number of cut points plus one.

left_closed

Set the intervals to be left-closed instead of right-closed.

include_breaks

Include a column with the right endpoint of the bin each observation falls in. This will change the data type of the output from a Categorical to a Struct.

Returns:
Expr

Expression of data type Categorical if include_breaks is set to False (default), otherwise an expression of data type Struct.

See also

qcut

Examples

Divide a column into three categories.

>>> df = pl.DataFrame({"foo": [-2, -1, 0, 1, 2]})
>>> df.with_columns(
...     pl.col("foo").cut([-1, 1], labels=["a", "b", "c"]).alias("cut")
... )
shape: (5, 2)
┌─────┬─────┐
│ foo ┆ cut │
│ --- ┆ --- │
│ i64 ┆ cat │
╞═════╪═════╡
│ -2  ┆ a   │
│ -1  ┆ a   │
│ 0   ┆ b   │
│ 1   ┆ b   │
│ 2   ┆ c   │
└─────┴─────┘

Add both the category and the breakpoint.

>>> df.with_columns(
...     pl.col("foo").cut([-1, 1], include_breaks=True).alias("cut")
... ).unnest("cut")
shape: (5, 3)
┌─────┬────────────┬────────────┐
│ foo ┆ breakpoint ┆ category   │
│ --- ┆ ---        ┆ ---        │
│ i64 ┆ f64        ┆ cat        │
╞═════╪════════════╪════════════╡
│ -2  ┆ -1.0       ┆ (-inf, -1] │
│ -1  ┆ -1.0       ┆ (-inf, -1] │
│ 0   ┆ 1.0        ┆ (-1, 1]    │
│ 1   ┆ 1.0        ┆ (-1, 1]    │
│ 2   ┆ inf        ┆ (1, inf]   │
└─────┴────────────┴────────────┘
degrees() Self[source]

Convert from radians to degrees.

Returns:
Expr

Expression of data type Float64.

Examples

>>> import math
>>> df = pl.DataFrame({"a": [x * math.pi for x in range(-4, 5)]})
>>> df.select(pl.col("a").degrees())
shape: (9, 1)
┌────────┐
│ a      │
│ ---    │
│ f64    │
╞════════╡
│ -720.0 │
│ -540.0 │
│ -360.0 │
│ -180.0 │
│ 0.0    │
│ 180.0  │
│ 360.0  │
│ 540.0  │
│ 720.0  │
└────────┘
classmethod deserialize(source: str | Path | IOBase) Self[source]

Read a serialized expression from a file.

Parameters:
source

Path to a file or a file-like object (by file-like object, we refer to objects that have a read() method, such as a file handler (e.g. via builtin open function) or BytesIO).

Warning

This function uses pickle when the logical plan contains Python UDFs, and as such inherits the security implications. Deserializing can execute arbitrary code, so it should only be attempted on trusted data.

Examples

>>> from io import StringIO
>>> expr = pl.col("foo").sum().over("bar")
>>> json = expr.meta.serialize()
>>> pl.Expr.deserialize(StringIO(json))  
<Expr ['col("foo").sum().over([col("ba…'] at ...>
diff(n: int = 1, null_behavior: NullBehavior = 'ignore') Self[source]

Calculate the first discrete difference between shifted items.

Parameters:
n

Number of slots to shift.

null_behavior{‘ignore’, ‘drop’}

How to handle null values.

Examples

>>> df = pl.DataFrame({"int": [20, 10, 30, 25, 35]})
>>> df.with_columns(change=pl.col("int").diff())
shape: (5, 2)
┌─────┬────────┐
│ int ┆ change │
│ --- ┆ ---    │
│ i64 ┆ i64    │
╞═════╪════════╡
│ 20  ┆ null   │
│ 10  ┆ -10    │
│ 30  ┆ 20     │
│ 25  ┆ -5     │
│ 35  ┆ 10     │
└─────┴────────┘
>>> df.with_columns(change=pl.col("int").diff(n=2))
shape: (5, 2)
┌─────┬────────┐
│ int ┆ change │
│ --- ┆ ---    │
│ i64 ┆ i64    │
╞═════╪════════╡
│ 20  ┆ null   │
│ 10  ┆ null   │
│ 30  ┆ 10     │
│ 25  ┆ 15     │
│ 35  ┆ 5      │
└─────┴────────┘
>>> df.select(pl.col("int").diff(n=2, null_behavior="drop").alias("diff"))
shape: (3, 1)
┌──────┐
│ diff │
│ ---  │
│ i64  │
╞══════╡
│ 10   │
│ 15   │
│ 5    │
└──────┘
dot(other: Expr | str) Self[source]

Compute the dot/inner product between two Expressions.

Parameters:
other

Expression to compute dot product with.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 3, 5],
...         "b": [2, 4, 6],
...     }
... )
>>> df.select(pl.col("a").dot(pl.col("b")))
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ i64 │
╞═════╡
│ 44  │
└─────┘
drop_nans() Self[source]

Drop all floating point NaN values.

The original order of the remaining elements is preserved.

See also

drop_nulls

Notes

A NaN value is not the same as a null value. To drop null values, use drop_nulls().

Examples

>>> df = pl.DataFrame({"a": [1.0, None, 3.0, float("nan")]})
>>> df.select(pl.col("a").drop_nans())
shape: (3, 1)
┌──────┐
│ a    │
│ ---  │
│ f64  │
╞══════╡
│ 1.0  │
│ null │
│ 3.0  │
└──────┘
drop_nulls() Self[source]

Drop all null values.

The original order of the remaining elements is preserved.

See also

drop_nans

Notes

A null value is not the same as a NaN value. To drop NaN values, use drop_nans().

Examples

>>> df = pl.DataFrame({"a": [1.0, None, 3.0, float("nan")]})
>>> df.select(pl.col("a").drop_nulls())
shape: (3, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 1.0 │
│ 3.0 │
│ NaN │
└─────┘
entropy(base: float = 2.718281828459045, *, normalize: bool = True) Self[source]

Computes the entropy.

Uses the formula -sum(pk * log(pk) where pk are discrete probabilities.

Parameters:
base

Given base, defaults to e

normalize

Normalize pk if it doesn’t sum to 1.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3]})
>>> df.select(pl.col("a").entropy(base=2))
shape: (1, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 1.459148 │
└──────────┘
>>> df.select(pl.col("a").entropy(base=2, normalize=False))
shape: (1, 1)
┌───────────┐
│ a         │
│ ---       │
│ f64       │
╞═══════════╡
│ -6.754888 │
└───────────┘
eq(other: Any) Self[source]

Method equivalent of equality operator expr == other.

Parameters:
other

A literal or expression value to compare with.

Examples

>>> df = pl.DataFrame(
...     data={
...         "x": [1.0, 2.0, float("nan"), 4.0],
...         "y": [2.0, 2.0, float("nan"), 4.0],
...     }
... )
>>> df.with_columns(
...     pl.col("x").eq(pl.col("y")).alias("x == y"),
... )
shape: (4, 3)
┌─────┬─────┬────────┐
│ x   ┆ y   ┆ x == y │
│ --- ┆ --- ┆ ---    │
│ f64 ┆ f64 ┆ bool   │
╞═════╪═════╪════════╡
│ 1.0 ┆ 2.0 ┆ false  │
│ 2.0 ┆ 2.0 ┆ true   │
│ NaN ┆ NaN ┆ true   │
│ 4.0 ┆ 4.0 ┆ true   │
└─────┴─────┴────────┘
eq_missing(other: Any) Self[source]

Method equivalent of equality operator expr == other where None == None.

This differs from default eq where null values are propagated.

Parameters:
other

A literal or expression value to compare with.

Examples

>>> df = pl.DataFrame(
...     data={
...         "x": [1.0, 2.0, float("nan"), 4.0, None, None],
...         "y": [2.0, 2.0, float("nan"), 4.0, 5.0, None],
...     }
... )
>>> df.with_columns(
...     pl.col("x").eq(pl.col("y")).alias("x eq y"),
...     pl.col("x").eq_missing(pl.col("y")).alias("x eq_missing y"),
... )
shape: (6, 4)
┌──────┬──────┬────────┬────────────────┐
│ x    ┆ y    ┆ x eq y ┆ x eq_missing y │
│ ---  ┆ ---  ┆ ---    ┆ ---            │
│ f64  ┆ f64  ┆ bool   ┆ bool           │
╞══════╪══════╪════════╪════════════════╡
│ 1.0  ┆ 2.0  ┆ false  ┆ false          │
│ 2.0  ┆ 2.0  ┆ true   ┆ true           │
│ NaN  ┆ NaN  ┆ true   ┆ true           │
│ 4.0  ┆ 4.0  ┆ true   ┆ true           │
│ null ┆ 5.0  ┆ null   ┆ false          │
│ null ┆ null ┆ null   ┆ true           │
└──────┴──────┴────────┴────────────────┘
ewm_mean(
*,
com: float | None = None,
span: float | None = None,
half_life: float | None = None,
alpha: float | None = None,
adjust: bool = True,
min_periods: int = 1,
ignore_nulls: bool = False,
) Self[source]

Exponentially-weighted moving average.

Parameters:
com

Specify decay in terms of center of mass, \(\gamma\), with

\[\alpha = \frac{1}{1 + \gamma} \; \forall \; \gamma \geq 0\]
span

Specify decay in terms of span, \(\theta\), with

\[\alpha = \frac{2}{\theta + 1} \; \forall \; \theta \geq 1\]
half_life

Specify decay in terms of half-life, \(\lambda\), with

\[\alpha = 1 - \exp \left\{ \frac{ -\ln(2) }{ \lambda } \right\} \; \forall \; \lambda > 0\]
alpha

Specify smoothing factor alpha directly, \(0 < \alpha \leq 1\).

adjust

Divide by decaying adjustment factor in beginning periods to account for imbalance in relative weightings

  • When adjust=True (the default) the EW function is calculated using weights \(w_i = (1 - \alpha)^i\)

  • When adjust=False the EW function is calculated recursively by

    \[\begin{split}y_0 &= x_0 \\ y_t &= (1 - \alpha)y_{t - 1} + \alpha x_t\end{split}\]
min_periods

Minimum number of observations in window required to have a value (otherwise result is null).

ignore_nulls

Ignore missing values when calculating weights.

  • When ignore_nulls=False (default), weights are based on absolute positions. For example, the weights of \(x_0\) and \(x_2\) used in calculating the final weighted average of [\(x_0\), None, \(x_2\)] are \((1-\alpha)^2\) and \(1\) if adjust=True, and \((1-\alpha)^2\) and \(\alpha\) if adjust=False.

  • When ignore_nulls=True, weights are based on relative positions. For example, the weights of \(x_0\) and \(x_2\) used in calculating the final weighted average of [\(x_0\), None, \(x_2\)] are \(1-\alpha\) and \(1\) if adjust=True, and \(1-\alpha\) and \(\alpha\) if adjust=False.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3]})
>>> df.select(pl.col("a").ewm_mean(com=1, ignore_nulls=False))
shape: (3, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 1.0      │
│ 1.666667 │
│ 2.428571 │
└──────────┘
ewm_mean_by(by: str | IntoExpr, *, half_life: str | timedelta) Self[source]

Calculate time-based exponentially weighted moving average.

Given observations \(x_1, x_2, \ldots, x_n\) at times \(t_1, t_2, \ldots, t_n\), the EWMA is calculated as

\[ \begin{align}\begin{aligned}y_0 &= x_0\\\alpha_i &= \exp(-\lambda(t_i - t_{i-1}))\\y_i &= \alpha_i x_i + (1 - \alpha_i) y_{i-1}; \quad i > 0\end{aligned}\end{align} \]

where \(\lambda\) equals \(\ln(2) / \text{half_life}\).

Parameters:
by

Times to calculate average by. Should be DateTime, Date, UInt64, UInt32, Int64, or Int32 data type.

half_life

Unit over which observation decays to half its value.

Can be created either from a timedelta, or by using the following string language:

  • 1ns (1 nanosecond)

  • 1us (1 microsecond)

  • 1ms (1 millisecond)

  • 1s (1 second)

  • 1m (1 minute)

  • 1h (1 hour)

  • 1d (1 day)

  • 1w (1 week)

  • 1i (1 index count)

Or combine them: “3d12h4m25s” # 3 days, 12 hours, 4 minutes, and 25 seconds

Note that half_life is treated as a constant duration - calendar durations such as months (or even days in the time-zone-aware case) are not supported, please express your duration in an approximately equivalent number of hours (e.g. ‘370h’ instead of ‘1mo’).

Returns:
Expr

Float32 if input is Float32, otherwise Float64.

Examples

>>> from datetime import date, timedelta
>>> df = pl.DataFrame(
...     {
...         "values": [0, 1, 2, None, 4],
...         "times": [
...             date(2020, 1, 1),
...             date(2020, 1, 3),
...             date(2020, 1, 10),
...             date(2020, 1, 15),
...             date(2020, 1, 17),
...         ],
...     }
... ).sort("times")
>>> df.with_columns(
...     result=pl.col("values").ewm_mean_by("times", half_life="4d"),
... )
shape: (5, 3)
┌────────┬────────────┬──────────┐
│ values ┆ times      ┆ result   │
│ ---    ┆ ---        ┆ ---      │
│ i64    ┆ date       ┆ f64      │
╞════════╪════════════╪══════════╡
│ 0      ┆ 2020-01-01 ┆ 0.0      │
│ 1      ┆ 2020-01-03 ┆ 0.292893 │
│ 2      ┆ 2020-01-10 ┆ 1.492474 │
│ null   ┆ 2020-01-15 ┆ null     │
│ 4      ┆ 2020-01-17 ┆ 3.254508 │
└────────┴────────────┴──────────┘
ewm_std(
*,
com: float | None = None,
span: float | None = None,
half_life: float | None = None,
alpha: float | None = None,
adjust: bool = True,
bias: bool = False,
min_periods: int = 1,
ignore_nulls: bool = False,
) Self[source]

Exponentially-weighted moving standard deviation.

Parameters:
com

Specify decay in terms of center of mass, \(\gamma\), with

\[\alpha = \frac{1}{1 + \gamma} \; \forall \; \gamma \geq 0\]
span

Specify decay in terms of span, \(\theta\), with

\[\alpha = \frac{2}{\theta + 1} \; \forall \; \theta \geq 1\]
half_life

Specify decay in terms of half-life, \(\lambda\), with

\[\alpha = 1 - \exp \left\{ \frac{ -\ln(2) }{ \lambda } \right\} \; \forall \; \lambda > 0\]
alpha

Specify smoothing factor alpha directly, \(0 < \alpha \leq 1\).

adjust

Divide by decaying adjustment factor in beginning periods to account for imbalance in relative weightings

  • When adjust=True (the default) the EW function is calculated using weights \(w_i = (1 - \alpha)^i\)

  • When adjust=False the EW function is calculated recursively by

    \[\begin{split}y_0 &= x_0 \\ y_t &= (1 - \alpha)y_{t - 1} + \alpha x_t\end{split}\]
bias

When bias=False, apply a correction to make the estimate statistically unbiased.

min_periods

Minimum number of observations in window required to have a value (otherwise result is null).

ignore_nulls

Ignore missing values when calculating weights.

  • When ignore_nulls=False (default), weights are based on absolute positions. For example, the weights of \(x_0\) and \(x_2\) used in calculating the final weighted average of [\(x_0\), None, \(x_2\)] are \((1-\alpha)^2\) and \(1\) if adjust=True, and \((1-\alpha)^2\) and \(\alpha\) if adjust=False.

  • When ignore_nulls=True, weights are based on relative positions. For example, the weights of \(x_0\) and \(x_2\) used in calculating the final weighted average of [\(x_0\), None, \(x_2\)] are \(1-\alpha\) and \(1\) if adjust=True, and \(1-\alpha\) and \(\alpha\) if adjust=False.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3]})
>>> df.select(pl.col("a").ewm_std(com=1, ignore_nulls=False))
shape: (3, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 0.0      │
│ 0.707107 │
│ 0.963624 │
└──────────┘
ewm_var(
*,
com: float | None = None,
span: float | None = None,
half_life: float | None = None,
alpha: float | None = None,
adjust: bool = True,
bias: bool = False,
min_periods: int = 1,
ignore_nulls: bool = False,
) Self[source]

Exponentially-weighted moving variance.

Parameters:
com

Specify decay in terms of center of mass, \(\gamma\), with

\[\alpha = \frac{1}{1 + \gamma} \; \forall \; \gamma \geq 0\]
span

Specify decay in terms of span, \(\theta\), with

\[\alpha = \frac{2}{\theta + 1} \; \forall \; \theta \geq 1\]
half_life

Specify decay in terms of half-life, \(\lambda\), with

\[\alpha = 1 - \exp \left\{ \frac{ -\ln(2) }{ \lambda } \right\} \; \forall \; \lambda > 0\]
alpha

Specify smoothing factor alpha directly, \(0 < \alpha \leq 1\).

adjust

Divide by decaying adjustment factor in beginning periods to account for imbalance in relative weightings

  • When adjust=True (the default) the EW function is calculated using weights \(w_i = (1 - \alpha)^i\)

  • When adjust=False the EW function is calculated recursively by

    \[\begin{split}y_0 &= x_0 \\ y_t &= (1 - \alpha)y_{t - 1} + \alpha x_t\end{split}\]
bias

When bias=False, apply a correction to make the estimate statistically unbiased.

min_periods

Minimum number of observations in window required to have a value (otherwise result is null).

ignore_nulls

Ignore missing values when calculating weights.

  • When ignore_nulls=False (default), weights are based on absolute positions. For example, the weights of \(x_0\) and \(x_2\) used in calculating the final weighted average of [\(x_0\), None, \(x_2\)] are \((1-\alpha)^2\) and \(1\) if adjust=True, and \((1-\alpha)^2\) and \(\alpha\) if adjust=False.

  • When ignore_nulls=True, weights are based on relative positions. For example, the weights of \(x_0\) and \(x_2\) used in calculating the final weighted average of [\(x_0\), None, \(x_2\)] are \(1-\alpha\) and \(1\) if adjust=True, and \(1-\alpha\) and \(\alpha\) if adjust=False.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3]})
>>> df.select(pl.col("a").ewm_var(com=1, ignore_nulls=False))
shape: (3, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 0.0      │
│ 0.5      │
│ 0.928571 │
└──────────┘
exclude(
columns: str | PolarsDataType | Collection[str] | Collection[PolarsDataType],
*more_columns: str | PolarsDataType,
) Self[source]

Exclude columns from a multi-column expression.

Only works after a wildcard or regex column selection, and you cannot provide both string column names and dtypes (you may prefer to use selectors instead).

Parameters:
columns

The name or datatype of the column(s) to exclude. Accepts regular expression input. Regular expressions should start with ^ and end with $.

*more_columns

Additional names or datatypes of columns to exclude, specified as positional arguments.

Examples

>>> df = pl.DataFrame(
...     {
...         "aa": [1, 2, 3],
...         "ba": ["a", "b", None],
...         "cc": [None, 2.5, 1.5],
...     }
... )
>>> df
shape: (3, 3)
┌─────┬──────┬──────┐
│ aa  ┆ ba   ┆ cc   │
│ --- ┆ ---  ┆ ---  │
│ i64 ┆ str  ┆ f64  │
╞═════╪══════╪══════╡
│ 1   ┆ a    ┆ null │
│ 2   ┆ b    ┆ 2.5  │
│ 3   ┆ null ┆ 1.5  │
└─────┴──────┴──────┘

Exclude by column name(s):

>>> df.select(pl.all().exclude("ba"))
shape: (3, 2)
┌─────┬──────┐
│ aa  ┆ cc   │
│ --- ┆ ---  │
│ i64 ┆ f64  │
╞═════╪══════╡
│ 1   ┆ null │
│ 2   ┆ 2.5  │
│ 3   ┆ 1.5  │
└─────┴──────┘

Exclude by regex, e.g. removing all columns whose names end with the letter “a”:

>>> df.select(pl.all().exclude("^.*a$"))
shape: (3, 1)
┌──────┐
│ cc   │
│ ---  │
│ f64  │
╞══════╡
│ null │
│ 2.5  │
│ 1.5  │
└──────┘

Exclude by dtype(s), e.g. removing all columns of type Int64 or Float64:

>>> df.select(pl.all().exclude([pl.Int64, pl.Float64]))
shape: (3, 1)
┌──────┐
│ ba   │
│ ---  │
│ str  │
╞══════╡
│ a    │
│ b    │
│ null │
└──────┘
exp() Self[source]

Compute the exponential, element-wise.

Examples

>>> df = pl.DataFrame({"values": [1.0, 2.0, 4.0]})
>>> df.select(pl.col("values").exp())
shape: (3, 1)
┌──────────┐
│ values   │
│ ---      │
│ f64      │
╞══════════╡
│ 2.718282 │
│ 7.389056 │
│ 54.59815 │
└──────────┘
explode() Self[source]

Explode a list expression.

This means that every item is expanded to a new row.

Returns:
Expr

Expression with the data type of the list elements.

See also

Expr.list.explode

Explode a list column.

Examples

>>> df = pl.DataFrame(
...     {
...         "group": ["a", "b"],
...         "values": [
...             [1, 2],
...             [3, 4],
...         ],
...     }
... )
>>> df.select(pl.col("values").explode())
shape: (4, 1)
┌────────┐
│ values │
│ ---    │
│ i64    │
╞════════╡
│ 1      │
│ 2      │
│ 3      │
│ 4      │
└────────┘
extend_constant(value: IntoExpr, n: int | IntoExprColumn) Self[source]

Extremely fast method for extending the Series with ‘n’ copies of a value.

Parameters:
value

A constant literal value or a unit expressioin with which to extend the expression result Series; can pass None to extend with nulls.

n

The number of additional values that will be added.

Examples

>>> df = pl.DataFrame({"values": [1, 2, 3]})
>>> df.select((pl.col("values") - 1).extend_constant(99, n=2))
shape: (5, 1)
┌────────┐
│ values │
│ ---    │
│ i64    │
╞════════╡
│ 0      │
│ 1      │
│ 2      │
│ 99     │
│ 99     │
└────────┘
fill_nan(value: int | float | Expr | None) Self[source]

Fill floating point NaN value with a fill value.

Parameters:
value

Value used to fill NaN values.

Warning

Note that floating point NaNs (Not a Number) are not missing values. To replace missing values, use fill_null().

See also

fill_null

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1.0, None, float("nan")],
...         "b": [4.0, float("nan"), 6],
...     }
... )
>>> df.with_columns(pl.col("b").fill_nan(0))
shape: (3, 2)
┌──────┬─────┐
│ a    ┆ b   │
│ ---  ┆ --- │
│ f64  ┆ f64 │
╞══════╪═════╡
│ 1.0  ┆ 4.0 │
│ null ┆ 0.0 │
│ NaN  ┆ 6.0 │
└──────┴─────┘
fill_null(
value: Any | Expr | None = None,
strategy: FillNullStrategy | None = None,
limit: int | None = None,
) Self[source]

Fill null values using the specified value or strategy.

To interpolate over null values see interpolate. See the examples below to fill nulls with an expression.

Parameters:
value

Value used to fill null values.

strategy{None, ‘forward’, ‘backward’, ‘min’, ‘max’, ‘mean’, ‘zero’, ‘one’}

Strategy used to fill null values.

limit

Number of consecutive null values to fill when using the ‘forward’ or ‘backward’ strategy.

See also

fill_nan

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, None],
...         "b": [4, None, 6],
...     }
... )
>>> df.with_columns(pl.col("b").fill_null(strategy="zero"))
shape: (3, 2)
┌──────┬─────┐
│ a    ┆ b   │
│ ---  ┆ --- │
│ i64  ┆ i64 │
╞══════╪═════╡
│ 1    ┆ 4   │
│ 2    ┆ 0   │
│ null ┆ 6   │
└──────┴─────┘
>>> df.with_columns(pl.col("b").fill_null(99))
shape: (3, 2)
┌──────┬─────┐
│ a    ┆ b   │
│ ---  ┆ --- │
│ i64  ┆ i64 │
╞══════╪═════╡
│ 1    ┆ 4   │
│ 2    ┆ 99  │
│ null ┆ 6   │
└──────┴─────┘
>>> df.with_columns(pl.col("b").fill_null(strategy="forward"))
shape: (3, 2)
┌──────┬─────┐
│ a    ┆ b   │
│ ---  ┆ --- │
│ i64  ┆ i64 │
╞══════╪═════╡
│ 1    ┆ 4   │
│ 2    ┆ 4   │
│ null ┆ 6   │
└──────┴─────┘
>>> df.with_columns(pl.col("b").fill_null(pl.col("b").median()))
shape: (3, 2)
┌──────┬─────┐
│ a    ┆ b   │
│ ---  ┆ --- │
│ i64  ┆ f64 │
╞══════╪═════╡
│ 1    ┆ 4.0 │
│ 2    ┆ 5.0 │
│ null ┆ 6.0 │
└──────┴─────┘
>>> df.with_columns(pl.all().fill_null(pl.all().median()))
shape: (3, 2)
┌─────┬─────┐
│ a   ┆ b   │
│ --- ┆ --- │
│ f64 ┆ f64 │
╞═════╪═════╡
│ 1.0 ┆ 4.0 │
│ 2.0 ┆ 5.0 │
│ 1.5 ┆ 6.0 │
└─────┴─────┘
filter(
*predicates: IntoExprColumn | Iterable[IntoExprColumn],
**constraints: Any,
) Self[source]

Filter the expression based on one or more predicate expressions.

The original order of the remaining elements is preserved.

Elements where the filter does not evaluate to True are discarded, including nulls.

Mostly useful in an aggregation context. If you want to filter on a DataFrame level, use LazyFrame.filter.

Parameters:
predicates

Expression(s) that evaluates to a boolean Series.

constraints

Column filters; use name = value to filter columns by the supplied value. Each constraint will behave the same as pl.col(name).eq(value), and will be implicitly joined with the other filter conditions using &.

Examples

>>> df = pl.DataFrame(
...     {
...         "group_col": ["g1", "g1", "g2"],
...         "b": [1, 2, 3],
...     }
... )
>>> df.group_by("group_col").agg(
...     lt=pl.col("b").filter(pl.col("b") < 2).sum(),
...     gte=pl.col("b").filter(pl.col("b") >= 2).sum(),
... ).sort("group_col")
shape: (2, 3)
┌───────────┬─────┬─────┐
│ group_col ┆ lt  ┆ gte │
│ ---       ┆ --- ┆ --- │
│ str       ┆ i64 ┆ i64 │
╞═══════════╪═════╪═════╡
│ g1        ┆ 1   ┆ 2   │
│ g2        ┆ 0   ┆ 3   │
└───────────┴─────┴─────┘

Filter expressions can also take constraints as keyword arguments.

>>> import polars.selectors as cs
>>> df = pl.DataFrame(
...     {
...         "key": ["a", "a", "a", "a", "b", "b", "b", "b", "b"],
...         "n": [1, 2, 2, 3, 1, 3, 3, 2, 3],
...     },
... )
>>> df.group_by("key").agg(
...     n_1=pl.col("n").filter(n=1).sum(),
...     n_2=pl.col("n").filter(n=2).sum(),
...     n_3=pl.col("n").filter(n=3).sum(),
... ).sort(by="key")
shape: (2, 4)
┌─────┬─────┬─────┬─────┐
│ key ┆ n_1 ┆ n_2 ┆ n_3 │
│ --- ┆ --- ┆ --- ┆ --- │
│ str ┆ i64 ┆ i64 ┆ i64 │
╞═════╪═════╪═════╪═════╡
│ a   ┆ 1   ┆ 4   ┆ 3   │
│ b   ┆ 1   ┆ 2   ┆ 9   │
└─────┴─────┴─────┴─────┘
first() Self[source]

Get the first value.

Examples

>>> df = pl.DataFrame({"a": [1, 1, 2]})
>>> df.select(pl.col("a").first())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ i64 │
╞═════╡
│ 1   │
└─────┘
flatten() Self[source]

Flatten a list or string column.

Alias for polars.expr.list.ExprListNameSpace.explode().

Examples

>>> df = pl.DataFrame(
...     {
...         "group": ["a", "b", "b"],
...         "values": [[1, 2], [2, 3], [4]],
...     }
... )
>>> df.group_by("group").agg(pl.col("values").flatten())  
shape: (2, 2)
┌───────┬───────────┐
│ group ┆ values    │
│ ---   ┆ ---       │
│ str   ┆ list[i64] │
╞═══════╪═══════════╡
│ a     ┆ [1, 2]    │
│ b     ┆ [2, 3, 4] │
└───────┴───────────┘
floor() Self[source]

Rounds down to the nearest integer value.

Only works on floating point Series.

Examples

>>> df = pl.DataFrame({"a": [0.3, 0.5, 1.0, 1.1]})
>>> df.select(pl.col("a").floor())
shape: (4, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 0.0 │
│ 0.0 │
│ 1.0 │
│ 1.0 │
└─────┘
floordiv(other: Any) Self[source]

Method equivalent of integer division operator expr // other.

Parameters:
other

Numeric literal or expression value.

See also

truediv

Examples

>>> df = pl.DataFrame({"x": [1, 2, 3, 4, 5]})
>>> df.with_columns(
...     pl.col("x").truediv(2).alias("x/2"),
...     pl.col("x").floordiv(2).alias("x//2"),
... )
shape: (5, 3)
┌─────┬─────┬──────┐
│ x   ┆ x/2 ┆ x//2 │
│ --- ┆ --- ┆ ---  │
│ i64 ┆ f64 ┆ i64  │
╞═════╪═════╪══════╡
│ 1   ┆ 0.5 ┆ 0    │
│ 2   ┆ 1.0 ┆ 1    │
│ 3   ┆ 1.5 ┆ 1    │
│ 4   ┆ 2.0 ┆ 2    │
│ 5   ┆ 2.5 ┆ 2    │
└─────┴─────┴──────┘

Note that Polars’ floordiv is subtly different from Python’s floor division. For example, consider 6.0 floor-divided by 0.1. Python gives:

>>> 6.0 // 0.1
59.0

because 0.1 is not represented internally as that exact value, but a slightly larger value. So the result of the division is slightly less than 60, meaning the flooring operation returns 59.0.

Polars instead first does the floating-point division, resulting in a floating-point value of 60.0, and then performs the flooring operation using floor:

>>> df = pl.DataFrame({"x": [6.0, 6.03]})
>>> df.with_columns(
...     pl.col("x").truediv(0.1).alias("x/0.1"),
... ).with_columns(
...     pl.col("x/0.1").floor().alias("x/0.1 floor"),
... )
shape: (2, 3)
┌──────┬───────┬─────────────┐
│ x    ┆ x/0.1 ┆ x/0.1 floor │
│ ---  ┆ ---   ┆ ---         │
│ f64  ┆ f64   ┆ f64         │
╞══════╪═══════╪═════════════╡
│ 6.0  ┆ 60.0  ┆ 60.0        │
│ 6.03 ┆ 60.3  ┆ 60.0        │
└──────┴───────┴─────────────┘

yielding the more intuitive result 60.0. The row with x = 6.03 is included to demonstrate the effect of the flooring operation.

floordiv combines those two steps to give the same result with one expression:

>>> df.with_columns(
...     pl.col("x").floordiv(0.1).alias("x//0.1"),
... )
shape: (2, 2)
┌──────┬────────┐
│ x    ┆ x//0.1 │
│ ---  ┆ ---    │
│ f64  ┆ f64    │
╞══════╪════════╡
│ 6.0  ┆ 60.0   │
│ 6.03 ┆ 60.0   │
└──────┴────────┘
forward_fill(limit: int | None = None) Self[source]

Fill missing values with the latest seen values.

Parameters:
limit

The number of consecutive null values to forward fill.

See also

backward_fill
shift

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, None],
...         "b": [4, None, 6],
...     }
... )
>>> df.select(pl.all().forward_fill())
shape: (3, 2)
┌─────┬─────┐
│ a   ┆ b   │
│ --- ┆ --- │
│ i64 ┆ i64 │
╞═════╪═════╡
│ 1   ┆ 4   │
│ 2   ┆ 4   │
│ 2   ┆ 6   │
└─────┴─────┘
classmethod from_json(value: str) Self[source]

Read an expression from a JSON encoded string to construct an Expression.

Deprecated since version 0.20.11: This method has been renamed to deserialize(). Note that the new method operates on file-like inputs rather than strings. Enclose your input in io.StringIO to keep the same behavior.

Parameters:
value

JSON encoded string value

gather(indices: int | Sequence[int] | Expr | Series | np.ndarray[Any, Any]) Self[source]

Take values by index.

Parameters:
indices

An expression that leads to a UInt32 dtyped Series.

Returns:
Expr

Expression of the same data type.

See also

Expr.get

Take a single value

Examples

>>> df = pl.DataFrame(
...     {
...         "group": [
...             "one",
...             "one",
...             "one",
...             "two",
...             "two",
...             "two",
...         ],
...         "value": [1, 98, 2, 3, 99, 4],
...     }
... )
>>> df.group_by("group", maintain_order=True).agg(
...     pl.col("value").gather([2, 1])
... )
shape: (2, 2)
┌───────┬───────────┐
│ group ┆ value     │
│ ---   ┆ ---       │
│ str   ┆ list[i64] │
╞═══════╪═══════════╡
│ one   ┆ [2, 98]   │
│ two   ┆ [4, 99]   │
└───────┴───────────┘
gather_every(n: int, offset: int = 0) Self[source]

Take every nth value in the Series and return as a new Series.

Parameters:
n

Gather every n-th row.

offset

Starting index.

Examples

>>> df = pl.DataFrame({"foo": [1, 2, 3, 4, 5, 6, 7, 8, 9]})
>>> df.select(pl.col("foo").gather_every(3))
shape: (3, 1)
┌─────┐
│ foo │
│ --- │
│ i64 │
╞═════╡
│ 1   │
│ 4   │
│ 7   │
└─────┘
>>> df.select(pl.col("foo").gather_every(3, offset=1))
shape: (3, 1)
┌─────┐
│ foo │
│ --- │
│ i64 │
╞═════╡
│ 2   │
│ 5   │
│ 8   │
└─────┘
ge(other: Any) Self[source]

Method equivalent of “greater than or equal” operator expr >= other.

Parameters:
other

A literal or expression value to compare with.

Examples

>>> df = pl.DataFrame(
...     data={
...         "x": [5.0, 4.0, float("nan"), 2.0],
...         "y": [5.0, 3.0, float("nan"), 1.0],
...     }
... )
>>> df.with_columns(
...     pl.col("x").ge(pl.col("y")).alias("x >= y"),
... )
shape: (4, 3)
┌─────┬─────┬────────┐
│ x   ┆ y   ┆ x >= y │
│ --- ┆ --- ┆ ---    │
│ f64 ┆ f64 ┆ bool   │
╞═════╪═════╪════════╡
│ 5.0 ┆ 5.0 ┆ true   │
│ 4.0 ┆ 3.0 ┆ true   │
│ NaN ┆ NaN ┆ true   │
│ 2.0 ┆ 1.0 ┆ true   │
└─────┴─────┴────────┘
get(index: int | Expr) Self[source]

Return a single value by index.

Parameters:
index

An expression that leads to a UInt32 index.

Returns:
Expr

Expression of the same data type.

Examples

>>> df = pl.DataFrame(
...     {
...         "group": [
...             "one",
...             "one",
...             "one",
...             "two",
...             "two",
...             "two",
...         ],
...         "value": [1, 98, 2, 3, 99, 4],
...     }
... )
>>> df.group_by("group", maintain_order=True).agg(pl.col("value").get(1))
shape: (2, 2)
┌───────┬───────┐
│ group ┆ value │
│ ---   ┆ ---   │
│ str   ┆ i64   │
╞═══════╪═══════╡
│ one   ┆ 98    │
│ two   ┆ 99    │
└───────┴───────┘
gt(other: Any) Self[source]

Method equivalent of “greater than” operator expr > other.

Parameters:
other

A literal or expression value to compare with.

Examples

>>> df = pl.DataFrame(
...     data={
...         "x": [5.0, 4.0, float("nan"), 2.0],
...         "y": [5.0, 3.0, float("nan"), 1.0],
...     }
... )
>>> df.with_columns(
...     pl.col("x").gt(pl.col("y")).alias("x > y"),
... )
shape: (4, 3)
┌─────┬─────┬───────┐
│ x   ┆ y   ┆ x > y │
│ --- ┆ --- ┆ ---   │
│ f64 ┆ f64 ┆ bool  │
╞═════╪═════╪═══════╡
│ 5.0 ┆ 5.0 ┆ false │
│ 4.0 ┆ 3.0 ┆ true  │
│ NaN ┆ NaN ┆ false │
│ 2.0 ┆ 1.0 ┆ true  │
└─────┴─────┴───────┘
has_nulls() Expr[source]

Check whether the expression contains one or more null values.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [None, 1, None],
...         "b": [10, None, 300],
...         "c": [350, 650, 850],
...     }
... )
>>> df.select(pl.all().has_nulls())
shape: (1, 3)
┌──────┬──────┬───────┐
│ a    ┆ b    ┆ c     │
│ ---  ┆ ---  ┆ ---   │
│ bool ┆ bool ┆ bool  │
╞══════╪══════╪═══════╡
│ true ┆ true ┆ false │
└──────┴──────┴───────┘
hash(
seed: int = 0,
seed_1: int | None = None,
seed_2: int | None = None,
seed_3: int | None = None,
) Self[source]

Hash the elements in the selection.

The hash value is of type UInt64.

Parameters:
seed

Random seed parameter. Defaults to 0.

seed_1

Random seed parameter. Defaults to seed if not set.

seed_2

Random seed parameter. Defaults to seed if not set.

seed_3

Random seed parameter. Defaults to seed if not set.

Notes

This implementation of hash does not guarantee stable results across different Polars versions. Its stability is only guaranteed within a single version.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, None],
...         "b": ["x", None, "z"],
...     }
... )
>>> df.with_columns(pl.all().hash(10, 20, 30, 40))  
shape: (3, 2)
┌──────────────────────┬──────────────────────┐
│ a                    ┆ b                    │
│ ---                  ┆ ---                  │
│ u64                  ┆ u64                  │
╞══════════════════════╪══════════════════════╡
│ 9774092659964970114  ┆ 13614470193936745724 │
│ 1101441246220388612  ┆ 11638928888656214026 │
│ 11638928888656214026 ┆ 13382926553367784577 │
└──────────────────────┴──────────────────────┘
head(n: int | Expr = 10) Self[source]

Get the first n rows.

Parameters:
n

Number of rows to return.

Examples

>>> df = pl.DataFrame({"foo": [1, 2, 3, 4, 5, 6, 7]})
>>> df.head(3)
shape: (3, 1)
┌─────┐
│ foo │
│ --- │
│ i64 │
╞═════╡
│ 1   │
│ 2   │
│ 3   │
└─────┘
hist(
bins: IntoExpr | None = None,
*,
bin_count: int | None = None,
include_category: bool = False,
include_breakpoint: bool = False,
) Self[source]

Bin values into buckets and count their occurrences.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Parameters:
bins

Discretizations to make. If None given, we determine the boundaries based on the data.

bin_count

If no bins provided, this will be used to determine the distance of the bins

include_breakpoint

Include a column that indicates the upper breakpoint.

include_category

Include a column that shows the intervals as categories.

Returns:
DataFrame

Examples

>>> df = pl.DataFrame({"a": [1, 3, 8, 8, 2, 1, 3]})
>>> df.select(pl.col("a").hist(bins=[1, 2, 3]))
shape: (4, 1)
┌─────┐
│ a   │
│ --- │
│ u32 │
╞═════╡
│ 2   │
│ 1   │
│ 2   │
│ 2   │
└─────┘
>>> df.select(
...     pl.col("a").hist(
...         bins=[1, 2, 3], include_breakpoint=True, include_category=True
...     )
... )
shape: (4, 1)
┌───────────────────────┐
│ a                     │
│ ---                   │
│ struct[3]             │
╞═══════════════════════╡
│ {1.0,"(-inf, 1.0]",2} │
│ {2.0,"(1.0, 2.0]",1}  │
│ {3.0,"(2.0, 3.0]",2}  │
│ {inf,"(3.0, inf]",2}  │
└───────────────────────┘
implode() Self[source]

Aggregate values into a list.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, 3],
...         "b": [4, 5, 6],
...     }
... )
>>> df.select(pl.all().implode())
shape: (1, 2)
┌───────────┬───────────┐
│ a         ┆ b         │
│ ---       ┆ ---       │
│ list[i64] ┆ list[i64] │
╞═══════════╪═══════════╡
│ [1, 2, 3] ┆ [4, 5, 6] │
└───────────┴───────────┘
inspect(fmt: str = '{}') Self[source]

Print the value that this expression evaluates to and pass on the value.

Examples

>>> df = pl.DataFrame({"foo": [1, 1, 2]})
>>> df.select(pl.col("foo").cum_sum().inspect("value is: {}").alias("bar"))
value is: shape: (3,)
Series: 'foo' [i64]
[
    1
    2
    4
]
shape: (3, 1)
┌─────┐
│ bar │
│ --- │
│ i64 │
╞═════╡
│ 1   │
│ 2   │
│ 4   │
└─────┘
interpolate(method: InterpolationMethod = 'linear') Self[source]

Fill null values using interpolation.

Parameters:
method{‘linear’, ‘nearest’}

Interpolation method.

Examples

Fill null values using linear interpolation.

>>> df = pl.DataFrame(
...     {
...         "a": [1, None, 3],
...         "b": [1.0, float("nan"), 3.0],
...     }
... )
>>> df.select(pl.all().interpolate())
shape: (3, 2)
┌─────┬─────┐
│ a   ┆ b   │
│ --- ┆ --- │
│ f64 ┆ f64 │
╞═════╪═════╡
│ 1.0 ┆ 1.0 │
│ 2.0 ┆ NaN │
│ 3.0 ┆ 3.0 │
└─────┴─────┘

Fill null values using nearest interpolation.

>>> df.select(pl.all().interpolate("nearest"))
shape: (3, 2)
┌─────┬─────┐
│ a   ┆ b   │
│ --- ┆ --- │
│ i64 ┆ f64 │
╞═════╪═════╡
│ 1   ┆ 1.0 │
│ 3   ┆ NaN │
│ 3   ┆ 3.0 │
└─────┴─────┘

Regrid data to a new grid.

>>> df_original_grid = pl.DataFrame(
...     {
...         "grid_points": [1, 3, 10],
...         "values": [2.0, 6.0, 20.0],
...     }
... )  # Interpolate from this to the new grid
>>> df_new_grid = pl.DataFrame({"grid_points": range(1, 11)})
>>> df_new_grid.join(
...     df_original_grid, on="grid_points", how="left", coalesce=True
... ).with_columns(pl.col("values").interpolate())
shape: (10, 2)
┌─────────────┬────────┐
│ grid_points ┆ values │
│ ---         ┆ ---    │
│ i64         ┆ f64    │
╞═════════════╪════════╡
│ 1           ┆ 2.0    │
│ 2           ┆ 4.0    │
│ 3           ┆ 6.0    │
│ 4           ┆ 8.0    │
│ 5           ┆ 10.0   │
│ 6           ┆ 12.0   │
│ 7           ┆ 14.0   │
│ 8           ┆ 16.0   │
│ 9           ┆ 18.0   │
│ 10          ┆ 20.0   │
└─────────────┴────────┘
interpolate_by(by: IntoExpr) Self[source]

Fill null values using interpolation based on another column.

Parameters:
by

Column to interpolate values based on.

Examples

Fill null values using linear interpolation.

>>> df = pl.DataFrame(
...     {
...         "a": [1, None, None, 3],
...         "b": [1, 2, 7, 8],
...     }
... )
>>> df.with_columns(a_interpolated=pl.col("a").interpolate_by("b"))
shape: (4, 3)
┌──────┬─────┬────────────────┐
│ a    ┆ b   ┆ a_interpolated │
│ ---  ┆ --- ┆ ---            │
│ i64  ┆ i64 ┆ f64            │
╞══════╪═════╪════════════════╡
│ 1    ┆ 1   ┆ 1.0            │
│ null ┆ 2   ┆ 1.285714       │
│ null ┆ 7   ┆ 2.714286       │
│ 3    ┆ 8   ┆ 3.0            │
└──────┴─────┴────────────────┘
is_between(
lower_bound: IntoExpr,
upper_bound: IntoExpr,
closed: ClosedInterval = 'both',
) Self[source]

Check if this expression is between the given lower and upper bounds.

Parameters:
lower_bound

Lower bound value. Accepts expression input. Strings are parsed as column names, other non-expression inputs are parsed as literals.

upper_bound

Upper bound value. Accepts expression input. Strings are parsed as column names, other non-expression inputs are parsed as literals.

closed{‘both’, ‘left’, ‘right’, ‘none’}

Define which sides of the interval are closed (inclusive).

Returns:
Expr

Expression of data type Boolean.

Notes

If the value of the lower_bound is greater than that of the upper_bound then the result will be False, as no value can satisfy the condition.

Examples

>>> df = pl.DataFrame({"num": [1, 2, 3, 4, 5]})
>>> df.with_columns(pl.col("num").is_between(2, 4).alias("is_between"))
shape: (5, 2)
┌─────┬────────────┐
│ num ┆ is_between │
│ --- ┆ ---        │
│ i64 ┆ bool       │
╞═════╪════════════╡
│ 1   ┆ false      │
│ 2   ┆ true       │
│ 3   ┆ true       │
│ 4   ┆ true       │
│ 5   ┆ false      │
└─────┴────────────┘

Use the closed argument to include or exclude the values at the bounds:

>>> df.with_columns(
...     pl.col("num").is_between(2, 4, closed="left").alias("is_between")
... )
shape: (5, 2)
┌─────┬────────────┐
│ num ┆ is_between │
│ --- ┆ ---        │
│ i64 ┆ bool       │
╞═════╪════════════╡
│ 1   ┆ false      │
│ 2   ┆ true       │
│ 3   ┆ true       │
│ 4   ┆ false      │
│ 5   ┆ false      │
└─────┴────────────┘

You can also use strings as well as numeric/temporal values (note: ensure that string literals are wrapped with lit so as not to conflate them with column names):

>>> df = pl.DataFrame({"a": ["a", "b", "c", "d", "e"]})
>>> df.with_columns(
...     pl.col("a")
...     .is_between(pl.lit("a"), pl.lit("c"), closed="both")
...     .alias("is_between")
... )
shape: (5, 2)
┌─────┬────────────┐
│ a   ┆ is_between │
│ --- ┆ ---        │
│ str ┆ bool       │
╞═════╪════════════╡
│ a   ┆ true       │
│ b   ┆ true       │
│ c   ┆ true       │
│ d   ┆ false      │
│ e   ┆ false      │
└─────┴────────────┘

Use column expressions as lower/upper bounds, comparing to a literal value:

>>> df = pl.DataFrame({"a": [1, 2, 3, 4, 5], "b": [5, 4, 3, 2, 1]})
>>> df.with_columns(
...     pl.lit(3).is_between(pl.col("a"), pl.col("b")).alias("between_ab")
... )
shape: (5, 3)
┌─────┬─────┬────────────┐
│ a   ┆ b   ┆ between_ab │
│ --- ┆ --- ┆ ---        │
│ i64 ┆ i64 ┆ bool       │
╞═════╪═════╪════════════╡
│ 1   ┆ 5   ┆ true       │
│ 2   ┆ 4   ┆ true       │
│ 3   ┆ 3   ┆ true       │
│ 4   ┆ 2   ┆ false      │
│ 5   ┆ 1   ┆ false      │
└─────┴─────┴────────────┘
is_duplicated() Self[source]

Return a boolean mask indicating duplicated values.

Returns:
Expr

Expression of data type Boolean.

Examples

>>> df = pl.DataFrame({"a": [1, 1, 2]})
>>> df.select(pl.col("a").is_duplicated())
shape: (3, 1)
┌───────┐
│ a     │
│ ---   │
│ bool  │
╞═══════╡
│ true  │
│ true  │
│ false │
└───────┘
is_finite() Self[source]

Returns a boolean Series indicating which values are finite.

Returns:
Expr

Expression of data type Boolean.

Examples

>>> df = pl.DataFrame(
...     {
...         "A": [1.0, 2],
...         "B": [3.0, float("inf")],
...     }
... )
>>> df.select(pl.all().is_finite())
shape: (2, 2)
┌──────┬───────┐
│ A    ┆ B     │
│ ---  ┆ ---   │
│ bool ┆ bool  │
╞══════╪═══════╡
│ true ┆ true  │
│ true ┆ false │
└──────┴───────┘
is_first_distinct() Self[source]

Return a boolean mask indicating the first occurrence of each distinct value.

Returns:
Expr

Expression of data type Boolean.

Examples

>>> df = pl.DataFrame({"a": [1, 1, 2, 3, 2]})
>>> df.with_columns(pl.col("a").is_first_distinct().alias("first"))
shape: (5, 2)
┌─────┬───────┐
│ a   ┆ first │
│ --- ┆ ---   │
│ i64 ┆ bool  │
╞═════╪═══════╡
│ 1   ┆ true  │
│ 1   ┆ false │
│ 2   ┆ true  │
│ 3   ┆ true  │
│ 2   ┆ false │
└─────┴───────┘
is_in(other: Expr | Collection[Any] | Series) Self[source]

Check if elements of this expression are present in the other Series.

Parameters:
other

Series or sequence of primitive type.

Returns:
Expr

Expression of data type Boolean.

Examples

>>> df = pl.DataFrame(
...     {"sets": [[1, 2, 3], [1, 2], [9, 10]], "optional_members": [1, 2, 3]}
... )
>>> df.with_columns(contains=pl.col("optional_members").is_in("sets"))
shape: (3, 3)
┌───────────┬──────────────────┬──────────┐
│ sets      ┆ optional_members ┆ contains │
│ ---       ┆ ---              ┆ ---      │
│ list[i64] ┆ i64              ┆ bool     │
╞═══════════╪══════════════════╪══════════╡
│ [1, 2, 3] ┆ 1                ┆ true     │
│ [1, 2]    ┆ 2                ┆ true     │
│ [9, 10]   ┆ 3                ┆ false    │
└───────────┴──────────────────┴──────────┘
is_infinite() Self[source]

Returns a boolean Series indicating which values are infinite.

Returns:
Expr

Expression of data type Boolean.

Examples

>>> df = pl.DataFrame(
...     {
...         "A": [1.0, 2],
...         "B": [3.0, float("inf")],
...     }
... )
>>> df.select(pl.all().is_infinite())
shape: (2, 2)
┌───────┬───────┐
│ A     ┆ B     │
│ ---   ┆ ---   │
│ bool  ┆ bool  │
╞═══════╪═══════╡
│ false ┆ false │
│ false ┆ true  │
└───────┴───────┘
is_last_distinct() Self[source]

Return a boolean mask indicating the last occurrence of each distinct value.

Returns:
Expr

Expression of data type Boolean.

Examples

>>> df = pl.DataFrame({"a": [1, 1, 2, 3, 2]})
>>> df.with_columns(pl.col("a").is_last_distinct().alias("last"))
shape: (5, 2)
┌─────┬───────┐
│ a   ┆ last  │
│ --- ┆ ---   │
│ i64 ┆ bool  │
╞═════╪═══════╡
│ 1   ┆ false │
│ 1   ┆ true  │
│ 2   ┆ false │
│ 3   ┆ true  │
│ 2   ┆ true  │
└─────┴───────┘
is_nan() Self[source]

Returns a boolean Series indicating which values are NaN.

Notes

Floating point NaN (Not A Number) should not be confused with missing data represented as Null/None.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, None, 1, 5],
...         "b": [1.0, 2.0, float("nan"), 1.0, 5.0],
...     }
... )
>>> df.with_columns(pl.col(pl.Float64).is_nan().name.suffix("_isnan"))
shape: (5, 3)
┌──────┬─────┬─────────┐
│ a    ┆ b   ┆ b_isnan │
│ ---  ┆ --- ┆ ---     │
│ i64  ┆ f64 ┆ bool    │
╞══════╪═════╪═════════╡
│ 1    ┆ 1.0 ┆ false   │
│ 2    ┆ 2.0 ┆ false   │
│ null ┆ NaN ┆ true    │
│ 1    ┆ 1.0 ┆ false   │
│ 5    ┆ 5.0 ┆ false   │
└──────┴─────┴─────────┘
is_not_nan() Self[source]

Returns a boolean Series indicating which values are not NaN.

Notes

Floating point NaN (Not A Number) should not be confused with missing data represented as Null/None.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, None, 1, 5],
...         "b": [1.0, 2.0, float("nan"), 1.0, 5.0],
...     }
... )
>>> df.with_columns(pl.col(pl.Float64).is_not_nan().name.suffix("_is_not_nan"))
shape: (5, 3)
┌──────┬─────┬──────────────┐
│ a    ┆ b   ┆ b_is_not_nan │
│ ---  ┆ --- ┆ ---          │
│ i64  ┆ f64 ┆ bool         │
╞══════╪═════╪══════════════╡
│ 1    ┆ 1.0 ┆ true         │
│ 2    ┆ 2.0 ┆ true         │
│ null ┆ NaN ┆ false        │
│ 1    ┆ 1.0 ┆ true         │
│ 5    ┆ 5.0 ┆ true         │
└──────┴─────┴──────────────┘
is_not_null() Self[source]

Returns a boolean Series indicating which values are not null.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, None, 1, 5],
...         "b": [1.0, 2.0, float("nan"), 1.0, 5.0],
...     }
... )
>>> df.with_columns(
...     pl.all().is_not_null().name.suffix("_not_null")  # nan != null
... )
shape: (5, 4)
┌──────┬─────┬────────────┬────────────┐
│ a    ┆ b   ┆ a_not_null ┆ b_not_null │
│ ---  ┆ --- ┆ ---        ┆ ---        │
│ i64  ┆ f64 ┆ bool       ┆ bool       │
╞══════╪═════╪════════════╪════════════╡
│ 1    ┆ 1.0 ┆ true       ┆ true       │
│ 2    ┆ 2.0 ┆ true       ┆ true       │
│ null ┆ NaN ┆ false      ┆ true       │
│ 1    ┆ 1.0 ┆ true       ┆ true       │
│ 5    ┆ 5.0 ┆ true       ┆ true       │
└──────┴─────┴────────────┴────────────┘
is_null() Self[source]

Returns a boolean Series indicating which values are null.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, None, 1, 5],
...         "b": [1.0, 2.0, float("nan"), 1.0, 5.0],
...     }
... )
>>> df.with_columns(pl.all().is_null().name.suffix("_isnull"))  # nan != null
shape: (5, 4)
┌──────┬─────┬──────────┬──────────┐
│ a    ┆ b   ┆ a_isnull ┆ b_isnull │
│ ---  ┆ --- ┆ ---      ┆ ---      │
│ i64  ┆ f64 ┆ bool     ┆ bool     │
╞══════╪═════╪══════════╪══════════╡
│ 1    ┆ 1.0 ┆ false    ┆ false    │
│ 2    ┆ 2.0 ┆ false    ┆ false    │
│ null ┆ NaN ┆ true     ┆ false    │
│ 1    ┆ 1.0 ┆ false    ┆ false    │
│ 5    ┆ 5.0 ┆ false    ┆ false    │
└──────┴─────┴──────────┴──────────┘
is_unique() Self[source]

Get mask of unique values.

Examples

>>> df = pl.DataFrame({"a": [1, 1, 2]})
>>> df.select(pl.col("a").is_unique())
shape: (3, 1)
┌───────┐
│ a     │
│ ---   │
│ bool  │
╞═══════╡
│ false │
│ false │
│ true  │
└───────┘
kurtosis(*, fisher: bool = True, bias: bool = True) Self[source]

Compute the kurtosis (Fisher or Pearson) of a dataset.

Kurtosis is the fourth central moment divided by the square of the variance. If Fisher’s definition is used, then 3.0 is subtracted from the result to give 0.0 for a normal distribution. If bias is False then the kurtosis is calculated using k statistics to eliminate bias coming from biased moment estimators.

See scipy.stats for more information

Parameters:
fisherbool, optional

If True, Fisher’s definition is used (normal ==> 0.0). If False, Pearson’s definition is used (normal ==> 3.0).

biasbool, optional

If False, the calculations are corrected for statistical bias.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3, 2, 1]})
>>> df.select(pl.col("a").kurtosis())
shape: (1, 1)
┌───────────┐
│ a         │
│ ---       │
│ f64       │
╞═══════════╡
│ -1.153061 │
└───────────┘
last() Self[source]

Get the last value.

Examples

>>> df = pl.DataFrame({"a": [1, 1, 2]})
>>> df.select(pl.col("a").last())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ i64 │
╞═════╡
│ 2   │
└─────┘
le(other: Any) Self[source]

Method equivalent of “less than or equal” operator expr <= other.

Parameters:
other

A literal or expression value to compare with.

Examples

>>> df = pl.DataFrame(
...     data={
...         "x": [5.0, 4.0, float("nan"), 0.5],
...         "y": [5.0, 3.5, float("nan"), 2.0],
...     }
... )
>>> df.with_columns(
...     pl.col("x").le(pl.col("y")).alias("x <= y"),
... )
shape: (4, 3)
┌─────┬─────┬────────┐
│ x   ┆ y   ┆ x <= y │
│ --- ┆ --- ┆ ---    │
│ f64 ┆ f64 ┆ bool   │
╞═════╪═════╪════════╡
│ 5.0 ┆ 5.0 ┆ true   │
│ 4.0 ┆ 3.5 ┆ false  │
│ NaN ┆ NaN ┆ true   │
│ 0.5 ┆ 2.0 ┆ true   │
└─────┴─────┴────────┘
len() Self[source]

Return the number of elements in the column.

Null values count towards the total.

Returns:
Expr

Expression of data type UInt32.

See also

count

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3], "b": [None, 4, 4]})
>>> df.select(pl.all().len())
shape: (1, 2)
┌─────┬─────┐
│ a   ┆ b   │
│ --- ┆ --- │
│ u32 ┆ u32 │
╞═════╪═════╡
│ 3   ┆ 3   │
└─────┴─────┘
limit(n: int | Expr = 10) Self[source]

Get the first n rows (alias for Expr.head()).

Parameters:
n

Number of rows to return.

Examples

>>> df = pl.DataFrame({"foo": [1, 2, 3, 4, 5, 6, 7]})
>>> df.limit(3)
shape: (3, 1)
┌─────┐
│ foo │
│ --- │
│ i64 │
╞═════╡
│ 1   │
│ 2   │
│ 3   │
└─────┘
log(base: float = 2.718281828459045) Self[source]

Compute the logarithm to a given base.

Parameters:
base

Given base, defaults to e

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3]})
>>> df.select(pl.col("a").log(base=2))
shape: (3, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 0.0      │
│ 1.0      │
│ 1.584963 │
└──────────┘
log10() Self[source]

Compute the base 10 logarithm of the input array, element-wise.

Examples

>>> df = pl.DataFrame({"values": [1.0, 2.0, 4.0]})
>>> df.select(pl.col("values").log10())
shape: (3, 1)
┌─────────┐
│ values  │
│ ---     │
│ f64     │
╞═════════╡
│ 0.0     │
│ 0.30103 │
│ 0.60206 │
└─────────┘
log1p() Self[source]

Compute the natural logarithm of each element plus one.

This computes log(1 + x) but is more numerically stable for x close to zero.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3]})
>>> df.select(pl.col("a").log1p())
shape: (3, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 0.693147 │
│ 1.098612 │
│ 1.386294 │
└──────────┘
lower_bound() Self[source]

Calculate the lower bound.

Returns a unit Series with the lowest value possible for the dtype of this expression.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3, 2, 1]})
>>> df.select(pl.col("a").lower_bound())
shape: (1, 1)
┌──────────────────────┐
│ a                    │
│ ---                  │
│ i64                  │
╞══════════════════════╡
│ -9223372036854775808 │
└──────────────────────┘
lt(other: Any) Self[source]

Method equivalent of “less than” operator expr < other.

Parameters:
other

A literal or expression value to compare with.

Examples

>>> df = pl.DataFrame(
...     data={
...         "x": [1.0, 2.0, float("nan"), 3.0],
...         "y": [2.0, 2.0, float("nan"), 4.0],
...     }
... )
>>> df.with_columns(
...     pl.col("x").lt(pl.col("y")).alias("x < y"),
... )
shape: (4, 3)
┌─────┬─────┬───────┐
│ x   ┆ y   ┆ x < y │
│ --- ┆ --- ┆ ---   │
│ f64 ┆ f64 ┆ bool  │
╞═════╪═════╪═══════╡
│ 1.0 ┆ 2.0 ┆ true  │
│ 2.0 ┆ 2.0 ┆ false │
│ NaN ┆ NaN ┆ false │
│ 3.0 ┆ 4.0 ┆ true  │
└─────┴─────┴───────┘
map_batches(
function: Callable[[Series], Series | Any],
return_dtype: PolarsDataType | None = None,
*,
agg_list: bool = False,
is_elementwise: bool = False,
returns_scalar: bool = False,
) Self[source]

Apply a custom python function to a whole Series or sequence of Series.

The output of this custom function is presumed to be either a Series, or a NumPy array (in which case it will be automatically converted into a Series), or a scalar that will be converted into a Series. If the result is a scalar and you want it to stay as a scalar, pass in returns_scalar=True. If you want to apply a custom function elementwise over single values, see map_elements(). A reasonable use case for map functions is transforming the values represented by an expression using a third-party library.

If your function returns a scalar, for example a float, use map_to_scalar() instead.

Parameters:
function

Lambda/function to apply.

return_dtype

Dtype of the output Series. If not set, the dtype will be inferred based on the first non-null value that is returned by the function.

is_elementwise

If set to true this can run in the streaming engine, but may yield incorrect results in group-by. Ensure you know what you are doing!

agg_list

Aggregate the values of the expression into a list before applying the function. This parameter only works in a group-by context. The function will be invoked only once on a list of groups, rather than once per group.

returns_scalar

If the function returns a scalar, by default it will be wrapped in a list in the output, since the assumption is that the function always returns something Series-like. If you want to keep the result as a scalar, set this argument to True.

Warning

If return_dtype is not provided, this may lead to unexpected results. We allow this, but it is considered a bug in the user’s query.

Examples

>>> df = pl.DataFrame(
...     {
...         "sine": [0.0, 1.0, 0.0, -1.0],
...         "cosine": [1.0, 0.0, -1.0, 0.0],
...     }
... )
>>> df.select(pl.all().map_batches(lambda x: x.to_numpy().argmax()))
shape: (1, 2)
┌──────┬────────┐
│ sine ┆ cosine │
│ ---  ┆ ---    │
│ i64  ┆ i64    │
╞══════╪════════╡
│ 1    ┆ 0      │
└──────┴────────┘

In a group-by context, the agg_list parameter can improve performance if used correctly. The following example has agg_list set to False, which causes the function to be applied once per group. The input of the function is a Series of type Int64. This is less efficient.

>>> df = pl.DataFrame(
...     {
...         "a": [0, 1, 0, 1],
...         "b": [1, 2, 3, 4],
...     }
... )
>>> df.group_by("a").agg(
...     pl.col("b").map_batches(lambda x: x + 2, agg_list=False)
... )  
shape: (2, 2)
┌─────┬───────────┐
│ a   ┆ b         │
│ --- ┆ ---       │
│ i64 ┆ list[i64] │
╞═════╪═══════════╡
│ 1   ┆ [4, 6]    │
│ 0   ┆ [3, 5]    │
└─────┴───────────┘

Using agg_list=True would be more efficient. In this example, the input of the function is a Series of type List(Int64).

>>> df.group_by("a").agg(
...     pl.col("b").map_batches(
...         lambda x: x.list.eval(pl.element() + 2), agg_list=True
...     )
... )  
shape: (2, 2)
┌─────┬───────────┐
│ a   ┆ b         │
│ --- ┆ ---       │
│ i64 ┆ list[i64] │
╞═════╪═══════════╡
│ 0   ┆ [3, 5]    │
│ 1   ┆ [4, 6]    │
└─────┴───────────┘

Here’s an example of a function that returns a scalar, where we want it to stay as a scalar:

>>> df = pl.DataFrame(
...     {
...         "a": [0, 1, 0, 1],
...         "b": [1, 2, 3, 4],
...     }
... )
>>> df.group_by("a").agg(
...     pl.col("b").map_batches(lambda x: x.max(), returns_scalar=True)
... )  
shape: (2, 2)
┌─────┬─────┐
│ a   ┆ b   │
│ --- ┆ --- │
│ i64 ┆ i64 │
╞═════╪═════╡
│ 1   ┆ 4   │
│ 0   ┆ 3   │
└─────┴─────┘
map_elements(
function: Callable[[Any], Any],
return_dtype: PolarsDataType | None = None,
*,
skip_nulls: bool = True,
pass_name: bool = False,
strategy: MapElementsStrategy = 'thread_local',
) Self[source]

Map a custom/user-defined function (UDF) to each element of a column.

Warning

This method is much slower than the native expressions API. Only use it if you cannot implement your logic otherwise.

Suppose that the function is: x sqrt(x):

  • For mapping elements of a series, consider: pl.col("col_name").sqrt().

  • For mapping inner elements of lists, consider: pl.col("col_name").list.eval(pl.element().sqrt()).

  • For mapping elements of struct fields, consider: pl.col("col_name").struct.field("field_name").sqrt().

If you want to replace the original column or field, consider .with_columns and .with_fields.

The UDF is applied to each element of a column. Note that, in a GroupBy context, the column will have been pre-aggregated and so each element will itself be a Series. Therefore, depending on the context, requirements for function differ:

  • Selection

    Expects function to be of type Callable[[Any], Any]. Applies a Python function to each individual value in the column.

  • GroupBy

    Expects function to be of type Callable[[Series], Any]. For each group, applies a Python function to the slice of the column corresponding to that group.

Parameters:
function

Lambda/function to map.

return_dtype

Dtype of the output Series. If not set, the dtype will be inferred based on the first non-null value that is returned by the function.

skip_nulls

Don’t map the function over values that contain nulls (this is faster).

pass_name

Pass the Series name to the custom function (this is more expensive).

strategy{‘thread_local’, ‘threading’}

The threading strategy to use.

  • ‘thread_local’: run the python function on a single thread.

  • ‘threading’: run the python function on separate threads. Use with care as this can slow performance. This might only speed up your code if the amount of work per element is significant and the python function releases the GIL (e.g. via calling a c function)

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Warning

If return_dtype is not provided, this may lead to unexpected results. We allow this, but it is considered a bug in the user’s query.

Notes

  • Using map_elements is strongly discouraged as you will be effectively running python “for” loops, which will be very slow. Wherever possible you should prefer the native expression API to achieve the best performance.

  • If your function is expensive and you don’t want it to be called more than once for a given input, consider applying an @lru_cache decorator to it. If your data is suitable you may achieve significant speedups.

  • Window function application using over is considered a GroupBy context here, so map_elements can be used to map functions over window groups.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, 3, 1],
...         "b": ["a", "b", "c", "c"],
...     }
... )

The function is applied to each element of column 'a':

>>> df.with_columns(  
...     pl.col("a")
...     .map_elements(lambda x: x * 2, return_dtype=pl.Int64)
...     .alias("a_times_2"),
... )
shape: (4, 3)
┌─────┬─────┬───────────┐
│ a   ┆ b   ┆ a_times_2 │
│ --- ┆ --- ┆ ---       │
│ i64 ┆ str ┆ i64       │
╞═════╪═════╪═══════════╡
│ 1   ┆ a   ┆ 2         │
│ 2   ┆ b   ┆ 4         │
│ 3   ┆ c   ┆ 6         │
│ 1   ┆ c   ┆ 2         │
└─────┴─────┴───────────┘

Tip: it is better to implement this with an expression:

>>> df.with_columns(
...     (pl.col("a") * 2).alias("a_times_2"),
... )  

In a GroupBy context, each element of the column is itself a Series:

>>> (
...     df.lazy().group_by("b").agg(pl.col("a")).collect()
... )  
shape: (3, 2)
┌─────┬───────────┐
│ b   ┆ a         │
│ --- ┆ ---       │
│ str ┆ list[i64] │
╞═════╪═══════════╡
│ a   ┆ [1]       │
│ b   ┆ [2]       │
│ c   ┆ [3, 1]    │
└─────┴───────────┘

Therefore, from the user’s point-of-view, the function is applied per-group:

>>> (
...     df.lazy()
...     .group_by("b")
...     .agg(pl.col("a").map_elements(lambda x: x.sum(), return_dtype=pl.Int64))
...     .collect()
... )  
shape: (3, 2)
┌─────┬─────┐
│ b   ┆ a   │
│ --- ┆ --- │
│ str ┆ i64 │
╞═════╪═════╡
│ a   ┆ 1   │
│ b   ┆ 2   │
│ c   ┆ 4   │
└─────┴─────┘

Tip: again, it is better to implement this with an expression:

>>> (
...     df.lazy()
...     .group_by("b", maintain_order=True)
...     .agg(pl.col("a").sum())
...     .collect()
... )  

Window function application using over will behave as a GroupBy context, with your function receiving individual window groups:

>>> df = pl.DataFrame(
...     {
...         "key": ["x", "x", "y", "x", "y", "z"],
...         "val": [1, 1, 1, 1, 1, 1],
...     }
... )
>>> df.with_columns(
...     scaled=pl.col("val")
...     .map_elements(lambda s: s * len(s), return_dtype=pl.List(pl.Int64))
...     .over("key"),
... ).sort("key")
shape: (6, 3)
┌─────┬─────┬────────┐
│ key ┆ val ┆ scaled │
│ --- ┆ --- ┆ ---    │
│ str ┆ i64 ┆ i64    │
╞═════╪═════╪════════╡
│ x   ┆ 1   ┆ 3      │
│ x   ┆ 1   ┆ 3      │
│ x   ┆ 1   ┆ 3      │
│ y   ┆ 1   ┆ 2      │
│ y   ┆ 1   ┆ 2      │
│ z   ┆ 1   ┆ 1      │
└─────┴─────┴────────┘

Note that this function would also be better-implemented natively:

>>> df.with_columns(
...     scaled=(pl.col("val") * pl.col("val").count()).over("key"),
... ).sort("key")  
max() Self[source]

Get maximum value.

Examples

>>> df = pl.DataFrame({"a": [-1, float("nan"), 1]})
>>> df.select(pl.col("a").max())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 1.0 │
└─────┘
mean() Self[source]

Get mean value.

Examples

>>> df = pl.DataFrame({"a": [-1, 0, 1]})
>>> df.select(pl.col("a").mean())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 0.0 │
└─────┘
median() Self[source]

Get median value using linear interpolation.

Examples

>>> df = pl.DataFrame({"a": [-1, 0, 1]})
>>> df.select(pl.col("a").median())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 0.0 │
└─────┘
min() Self[source]

Get minimum value.

Examples

>>> df = pl.DataFrame({"a": [-1, float("nan"), 1]})
>>> df.select(pl.col("a").min())
shape: (1, 1)
┌──────┐
│ a    │
│ ---  │
│ f64  │
╞══════╡
│ -1.0 │
└──────┘
mod(other: Any) Self[source]

Method equivalent of modulus operator expr % other.

Parameters:
other

Numeric literal or expression value.

Examples

>>> df = pl.DataFrame({"x": [0, 1, 2, 3, 4]})
>>> df.with_columns(pl.col("x").mod(2).alias("x%2"))
shape: (5, 2)
┌─────┬─────┐
│ x   ┆ x%2 │
│ --- ┆ --- │
│ i64 ┆ i64 │
╞═════╪═════╡
│ 0   ┆ 0   │
│ 1   ┆ 1   │
│ 2   ┆ 0   │
│ 3   ┆ 1   │
│ 4   ┆ 0   │
└─────┴─────┘
mode() Self[source]

Compute the most occurring value(s).

Can return multiple Values.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 1, 2, 3],
...         "b": [1, 1, 2, 2],
...     }
... )
>>> df.select(pl.all().mode())  
shape: (2, 2)
┌─────┬─────┐
│ a   ┆ b   │
│ --- ┆ --- │
│ i64 ┆ i64 │
╞═════╪═════╡
│ 1   ┆ 1   │
│ 1   ┆ 2   │
└─────┴─────┘
mul(other: Any) Self[source]

Method equivalent of multiplication operator expr * other.

Parameters:
other

Numeric literal or expression value.

Examples

>>> df = pl.DataFrame({"x": [1, 2, 4, 8, 16]})
>>> df.with_columns(
...     pl.col("x").mul(2).alias("x*2"),
...     pl.col("x").mul(pl.col("x").log(2)).alias("x * xlog2"),
... )
shape: (5, 3)
┌─────┬─────┬───────────┐
│ x   ┆ x*2 ┆ x * xlog2 │
│ --- ┆ --- ┆ ---       │
│ i64 ┆ i64 ┆ f64       │
╞═════╪═════╪═══════════╡
│ 1   ┆ 2   ┆ 0.0       │
│ 2   ┆ 4   ┆ 2.0       │
│ 4   ┆ 8   ┆ 8.0       │
│ 8   ┆ 16  ┆ 24.0      │
│ 16  ┆ 32  ┆ 64.0      │
└─────┴─────┴───────────┘
n_unique() Self[source]

Count unique values.

Notes

null is considered to be a unique value for the purposes of this operation.

Examples

>>> df = pl.DataFrame({"x": [1, 1, 2, 2, 3], "y": [1, 1, 1, None, None]})
>>> df.select(
...     x_unique=pl.col("x").n_unique(),
...     y_unique=pl.col("y").n_unique(),
... )
shape: (1, 2)
┌──────────┬──────────┐
│ x_unique ┆ y_unique │
│ ---      ┆ ---      │
│ u32      ┆ u32      │
╞══════════╪══════════╡
│ 3        ┆ 2        │
└──────────┴──────────┘
nan_max() Self[source]

Get maximum value, but propagate/poison encountered NaN values.

This differs from numpy’s nanmax as numpy defaults to propagating NaN values, whereas polars defaults to ignoring them.

Examples

>>> df = pl.DataFrame({"a": [0, float("nan")]})
>>> df.select(pl.col("a").nan_max())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ NaN │
└─────┘
nan_min() Self[source]

Get minimum value, but propagate/poison encountered NaN values.

This differs from numpy’s nanmax as numpy defaults to propagating NaN values, whereas polars defaults to ignoring them.

Examples

>>> df = pl.DataFrame({"a": [0, float("nan")]})
>>> df.select(pl.col("a").nan_min())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ NaN │
└─────┘
ne(other: Any) Self[source]

Method equivalent of inequality operator expr != other.

Parameters:
other

A literal or expression value to compare with.

Examples

>>> df = pl.DataFrame(
...     data={
...         "x": [1.0, 2.0, float("nan"), 4.0],
...         "y": [2.0, 2.0, float("nan"), 4.0],
...     }
... )
>>> df.with_columns(
...     pl.col("x").ne(pl.col("y")).alias("x != y"),
... )
shape: (4, 3)
┌─────┬─────┬────────┐
│ x   ┆ y   ┆ x != y │
│ --- ┆ --- ┆ ---    │
│ f64 ┆ f64 ┆ bool   │
╞═════╪═════╪════════╡
│ 1.0 ┆ 2.0 ┆ true   │
│ 2.0 ┆ 2.0 ┆ false  │
│ NaN ┆ NaN ┆ false  │
│ 4.0 ┆ 4.0 ┆ false  │
└─────┴─────┴────────┘
ne_missing(other: Any) Self[source]

Method equivalent of equality operator expr != other where None == None.

This differs from default ne where null values are propagated.

Parameters:
other

A literal or expression value to compare with.

Examples

>>> df = pl.DataFrame(
...     data={
...         "x": [1.0, 2.0, float("nan"), 4.0, None, None],
...         "y": [2.0, 2.0, float("nan"), 4.0, 5.0, None],
...     }
... )
>>> df.with_columns(
...     pl.col("x").ne(pl.col("y")).alias("x ne y"),
...     pl.col("x").ne_missing(pl.col("y")).alias("x ne_missing y"),
... )
shape: (6, 4)
┌──────┬──────┬────────┬────────────────┐
│ x    ┆ y    ┆ x ne y ┆ x ne_missing y │
│ ---  ┆ ---  ┆ ---    ┆ ---            │
│ f64  ┆ f64  ┆ bool   ┆ bool           │
╞══════╪══════╪════════╪════════════════╡
│ 1.0  ┆ 2.0  ┆ true   ┆ true           │
│ 2.0  ┆ 2.0  ┆ false  ┆ false          │
│ NaN  ┆ NaN  ┆ false  ┆ false          │
│ 4.0  ┆ 4.0  ┆ false  ┆ false          │
│ null ┆ 5.0  ┆ null   ┆ true           │
│ null ┆ null ┆ null   ┆ false          │
└──────┴──────┴────────┴────────────────┘
neg() Self[source]

Method equivalent of unary minus operator -expr.

Examples

>>> df = pl.DataFrame({"a": [-1, 0, 2, None]})
>>> df.with_columns(pl.col("a").neg())
shape: (4, 1)
┌──────┐
│ a    │
│ ---  │
│ i64  │
╞══════╡
│ 1    │
│ 0    │
│ -2   │
│ null │
└──────┘
not_() Self[source]

Negate a boolean expression.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [True, False, False],
...         "b": ["a", "b", None],
...     }
... )
>>> df
shape: (3, 2)
┌───────┬──────┐
│ a     ┆ b    │
│ ---   ┆ ---  │
│ bool  ┆ str  │
╞═══════╪══════╡
│ true  ┆ a    │
│ false ┆ b    │
│ false ┆ null │
└───────┴──────┘
>>> df.select(pl.col("a").not_())
shape: (3, 1)
┌───────┐
│ a     │
│ ---   │
│ bool  │
╞═══════╡
│ false │
│ true  │
│ true  │
└───────┘
null_count() Self[source]

Count null values.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [None, 1, None],
...         "b": [10, None, 300],
...         "c": [350, 650, 850],
...     }
... )
>>> df.select(pl.all().null_count())
shape: (1, 3)
┌─────┬─────┬─────┐
│ a   ┆ b   ┆ c   │
│ --- ┆ --- ┆ --- │
│ u32 ┆ u32 ┆ u32 │
╞═════╪═════╪═════╡
│ 2   ┆ 1   ┆ 0   │
└─────┴─────┴─────┘
or_(*others: Any) Self[source]

Method equivalent of bitwise “or” operator expr | other | ....

Parameters:
*others

One or more integer or boolean expressions to evaluate/combine.

Examples

>>> df = pl.DataFrame(
...     data={
...         "x": [5, 6, 7, 4, 8],
...         "y": [1.5, 2.5, 1.0, 4.0, -5.75],
...         "z": [-9, 2, -1, 4, 8],
...     }
... )
>>> df.select(
...     (pl.col("x") == pl.col("y"))
...     .or_(
...         pl.col("x") == pl.col("y"),
...         pl.col("y") == pl.col("z"),
...         pl.col("y").cast(int) == pl.col("z"),
...     )
...     .alias("any")
... )
shape: (5, 1)
┌───────┐
│ any   │
│ ---   │
│ bool  │
╞═══════╡
│ false │
│ true  │
│ false │
│ true  │
│ false │
└───────┘
over(
partition_by: IntoExpr | Iterable[IntoExpr],
*more_exprs: IntoExpr,
order_by: IntoExpr | Iterable[IntoExpr] | None = None,
mapping_strategy: WindowMappingStrategy = 'group_to_rows',
) Self[source]

Compute expressions over the given groups.

This expression is similar to performing a group by aggregation and joining the result back into the original DataFrame.

The outcome is similar to how window functions work in PostgreSQL.

Parameters:
partition_by

Column(s) to group by. Accepts expression input. Strings are parsed as column names.

*more_exprs

Additional columns to group by, specified as positional arguments.

order_by:

Order the window functions/aggregations with the partitioned groups by the result of the expression passed to order_by.

mapping_strategy: {‘group_to_rows’, ‘join’, ‘explode’}
  • group_to_rows

    If the aggregation results in multiple values, assign them back to their position in the DataFrame. This can only be done if the group yields the same elements before aggregation as after.

  • join

    Join the groups as ‘List<group_dtype>’ to the row positions. warning: this can be memory intensive.

  • explode

    Explodes the grouped data into new rows, similar to the results of group_by + agg + explode. Sorting of the given groups is required if the groups are not part of the window operation for the operation, otherwise the result would not make sense. This operation changes the number of rows.

Examples

Pass the name of a column to compute the expression over that column.

>>> df = pl.DataFrame(
...     {
...         "a": ["a", "a", "b", "b", "b"],
...         "b": [1, 2, 3, 5, 3],
...         "c": [5, 4, 3, 2, 1],
...     }
... )
>>> df.with_columns(
...     pl.col("c").max().over("a").name.suffix("_max"),
... )
shape: (5, 4)
┌─────┬─────┬─────┬───────┐
│ a   ┆ b   ┆ c   ┆ c_max │
│ --- ┆ --- ┆ --- ┆ ---   │
│ str ┆ i64 ┆ i64 ┆ i64   │
╞═════╪═════╪═════╪═══════╡
│ a   ┆ 1   ┆ 5   ┆ 5     │
│ a   ┆ 2   ┆ 4   ┆ 5     │
│ b   ┆ 3   ┆ 3   ┆ 3     │
│ b   ┆ 5   ┆ 2   ┆ 3     │
│ b   ┆ 3   ┆ 1   ┆ 3     │
└─────┴─────┴─────┴───────┘

Expression input is supported.

>>> df.with_columns(
...     pl.col("c").max().over(pl.col("b") // 2).name.suffix("_max"),
... )
shape: (5, 4)
┌─────┬─────┬─────┬───────┐
│ a   ┆ b   ┆ c   ┆ c_max │
│ --- ┆ --- ┆ --- ┆ ---   │
│ str ┆ i64 ┆ i64 ┆ i64   │
╞═════╪═════╪═════╪═══════╡
│ a   ┆ 1   ┆ 5   ┆ 5     │
│ a   ┆ 2   ┆ 4   ┆ 4     │
│ b   ┆ 3   ┆ 3   ┆ 4     │
│ b   ┆ 5   ┆ 2   ┆ 2     │
│ b   ┆ 3   ┆ 1   ┆ 4     │
└─────┴─────┴─────┴───────┘

Group by multiple columns by passing a list of column names or expressions.

>>> df.with_columns(
...     pl.col("c").min().over(["a", "b"]).name.suffix("_min"),
... )
shape: (5, 4)
┌─────┬─────┬─────┬───────┐
│ a   ┆ b   ┆ c   ┆ c_min │
│ --- ┆ --- ┆ --- ┆ ---   │
│ str ┆ i64 ┆ i64 ┆ i64   │
╞═════╪═════╪═════╪═══════╡
│ a   ┆ 1   ┆ 5   ┆ 5     │
│ a   ┆ 2   ┆ 4   ┆ 4     │
│ b   ┆ 3   ┆ 3   ┆ 1     │
│ b   ┆ 5   ┆ 2   ┆ 2     │
│ b   ┆ 3   ┆ 1   ┆ 1     │
└─────┴─────┴─────┴───────┘

Or use positional arguments to group by multiple columns in the same way.

>>> df.with_columns(
...     pl.col("c").min().over("a", pl.col("b") % 2).name.suffix("_min"),
... )
shape: (5, 4)
┌─────┬─────┬─────┬───────┐
│ a   ┆ b   ┆ c   ┆ c_min │
│ --- ┆ --- ┆ --- ┆ ---   │
│ str ┆ i64 ┆ i64 ┆ i64   │
╞═════╪═════╪═════╪═══════╡
│ a   ┆ 1   ┆ 5   ┆ 5     │
│ a   ┆ 2   ┆ 4   ┆ 4     │
│ b   ┆ 3   ┆ 3   ┆ 1     │
│ b   ┆ 5   ┆ 2   ┆ 1     │
│ b   ┆ 3   ┆ 1   ┆ 1     │
└─────┴─────┴─────┴───────┘

Aggregate values from each group using mapping_strategy="explode".

>>> df.select(
...     pl.col("a").head(2).over("a", mapping_strategy="explode"),
...     pl.col("b").sort_by("b").head(2).over("a", mapping_strategy="explode"),
...     pl.col("c").sort_by("b").head(2).over("a", mapping_strategy="explode"),
... )
shape: (4, 3)
┌─────┬─────┬─────┐
│ a   ┆ b   ┆ c   │
│ --- ┆ --- ┆ --- │
│ str ┆ i64 ┆ i64 │
╞═════╪═════╪═════╡
│ a   ┆ 1   ┆ 5   │
│ a   ┆ 2   ┆ 4   │
│ b   ┆ 3   ┆ 3   │
│ b   ┆ 3   ┆ 1   │
└─────┴─────┴─────┘
pct_change(n: int | IntoExprColumn = 1) Self[source]

Computes percentage change between values.

Percentage change (as fraction) between current element and most-recent non-null element at least n period(s) before the current element.

Computes the change from the previous row by default.

Parameters:
n

periods to shift for forming percent change.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [10, 11, 12, None, 12],
...     }
... )
>>> df.with_columns(pl.col("a").pct_change().alias("pct_change"))
shape: (5, 2)
┌──────┬────────────┐
│ a    ┆ pct_change │
│ ---  ┆ ---        │
│ i64  ┆ f64        │
╞══════╪════════════╡
│ 10   ┆ null       │
│ 11   ┆ 0.1        │
│ 12   ┆ 0.090909   │
│ null ┆ 0.0        │
│ 12   ┆ 0.0        │
└──────┴────────────┘
peak_max() Self[source]

Get a boolean mask of the local maximum peaks.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3, 4, 5]})
>>> df.select(pl.col("a").peak_max())
shape: (5, 1)
┌───────┐
│ a     │
│ ---   │
│ bool  │
╞═══════╡
│ false │
│ false │
│ false │
│ false │
│ true  │
└───────┘
peak_min() Self[source]

Get a boolean mask of the local minimum peaks.

Examples

>>> df = pl.DataFrame({"a": [4, 1, 3, 2, 5]})
>>> df.select(pl.col("a").peak_min())
shape: (5, 1)
┌───────┐
│ a     │
│ ---   │
│ bool  │
╞═══════╡
│ false │
│ true  │
│ false │
│ true  │
│ false │
└───────┘
pipe(
function: Callable[Concatenate[Expr, P], T],
*args: P.args,
**kwargs: P.kwargs,
) T[source]

Offers a structured way to apply a sequence of user-defined functions (UDFs).

Parameters:
function

Callable; will receive the expression as the first parameter, followed by any given args/kwargs.

*args

Arguments to pass to the UDF.

**kwargs

Keyword arguments to pass to the UDF.

Examples

>>> def extract_number(expr: pl.Expr) -> pl.Expr:
...     """Extract the digits from a string."""
...     return expr.str.extract(r"\d+", 0).cast(pl.Int64)
>>>
>>> def scale_negative_even(expr: pl.Expr, *, n: int = 1) -> pl.Expr:
...     """Set even numbers negative, and scale by a user-supplied value."""
...     expr = pl.when(expr % 2 == 0).then(-expr).otherwise(expr)
...     return expr * n
>>>
>>> df = pl.DataFrame({"val": ["a: 1", "b: 2", "c: 3", "d: 4"]})
>>> df.with_columns(
...     udfs=(
...         pl.col("val").pipe(extract_number).pipe(scale_negative_even, n=5)
...     ),
... )
shape: (4, 2)
┌──────┬──────┐
│ val  ┆ udfs │
│ ---  ┆ ---  │
│ str  ┆ i64  │
╞══════╪══════╡
│ a: 1 ┆ 5    │
│ b: 2 ┆ -10  │
│ c: 3 ┆ 15   │
│ d: 4 ┆ -20  │
└──────┴──────┘
pow(exponent: IntoExprColumn | int | float) Self[source]

Method equivalent of exponentiation operator expr ** exponent.

If the exponent is float, the result follows the dtype of exponent. Otherwise, it follows dtype of base.

Parameters:
exponent

Numeric literal or expression exponent value.

Examples

>>> df = pl.DataFrame({"x": [1, 2, 4, 8]})
>>> df.with_columns(
...     pl.col("x").pow(3).alias("cube"),
...     pl.col("x").pow(pl.col("x").log(2)).alias("x ** xlog2"),
... )
shape: (4, 3)
┌─────┬──────┬────────────┐
│ x   ┆ cube ┆ x ** xlog2 │
│ --- ┆ ---  ┆ ---        │
│ i64 ┆ i64  ┆ f64        │
╞═════╪══════╪════════════╡
│ 1   ┆ 1    ┆ 1.0        │
│ 2   ┆ 8    ┆ 2.0        │
│ 4   ┆ 64   ┆ 16.0       │
│ 8   ┆ 512  ┆ 512.0      │
└─────┴──────┴────────────┘

Raising an integer to a positive integer results in an integer - in order to raise to a negative integer, you can cast either the base or the exponent to float first:

>>> df.with_columns(
...     x_squared=pl.col("x").pow(2),
...     x_inverse=pl.col("x").pow(-1.0),
... )
shape: (4, 3)
┌─────┬───────────┬───────────┐
│ x   ┆ x_squared ┆ x_inverse │
│ --- ┆ ---       ┆ ---       │
│ i64 ┆ i64       ┆ f64       │
╞═════╪═══════════╪═══════════╡
│ 1   ┆ 1         ┆ 1.0       │
│ 2   ┆ 4         ┆ 0.5       │
│ 4   ┆ 16        ┆ 0.25      │
│ 8   ┆ 64        ┆ 0.125     │
└─────┴───────────┴───────────┘
product() Self[source]

Compute the product of an expression.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3]})
>>> df.select(pl.col("a").product())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ i64 │
╞═════╡
│ 6   │
└─────┘
qcut(
quantiles: Sequence[float] | int,
*,
labels: Sequence[str] | None = None,
left_closed: bool = False,
allow_duplicates: bool = False,
include_breaks: bool = False,
) Self[source]

Bin continuous values into discrete categories based on their quantiles.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Parameters:
quantiles

Either a list of quantile probabilities between 0 and 1 or a positive integer determining the number of bins with uniform probability.

labels

Names of the categories. The number of labels must be equal to the number of categories.

left_closed

Set the intervals to be left-closed instead of right-closed.

allow_duplicates

If set to True, duplicates in the resulting quantiles are dropped, rather than raising a DuplicateError. This can happen even with unique probabilities, depending on the data.

include_breaks

Include a column with the right endpoint of the bin each observation falls in. This will change the data type of the output from a Categorical to a Struct.

Returns:
Expr

Expression of data type Categorical if include_breaks is set to False (default), otherwise an expression of data type Struct.

See also

cut

Examples

Divide a column into three categories according to pre-defined quantile probabilities.

>>> df = pl.DataFrame({"foo": [-2, -1, 0, 1, 2]})
>>> df.with_columns(
...     pl.col("foo").qcut([0.25, 0.75], labels=["a", "b", "c"]).alias("qcut")
... )
shape: (5, 2)
┌─────┬──────┐
│ foo ┆ qcut │
│ --- ┆ ---  │
│ i64 ┆ cat  │
╞═════╪══════╡
│ -2  ┆ a    │
│ -1  ┆ a    │
│ 0   ┆ b    │
│ 1   ┆ b    │
│ 2   ┆ c    │
└─────┴──────┘

Divide a column into two categories using uniform quantile probabilities.

>>> df.with_columns(
...     pl.col("foo")
...     .qcut(2, labels=["low", "high"], left_closed=True)
...     .alias("qcut")
... )
shape: (5, 2)
┌─────┬──────┐
│ foo ┆ qcut │
│ --- ┆ ---  │
│ i64 ┆ cat  │
╞═════╪══════╡
│ -2  ┆ low  │
│ -1  ┆ low  │
│ 0   ┆ high │
│ 1   ┆ high │
│ 2   ┆ high │
└─────┴──────┘

Add both the category and the breakpoint.

>>> df.with_columns(
...     pl.col("foo").qcut([0.25, 0.75], include_breaks=True).alias("qcut")
... ).unnest("qcut")
shape: (5, 3)
┌─────┬────────────┬────────────┐
│ foo ┆ breakpoint ┆ category   │
│ --- ┆ ---        ┆ ---        │
│ i64 ┆ f64        ┆ cat        │
╞═════╪════════════╪════════════╡
│ -2  ┆ -1.0       ┆ (-inf, -1] │
│ -1  ┆ -1.0       ┆ (-inf, -1] │
│ 0   ┆ 1.0        ┆ (-1, 1]    │
│ 1   ┆ 1.0        ┆ (-1, 1]    │
│ 2   ┆ inf        ┆ (1, inf]   │
└─────┴────────────┴────────────┘
quantile(
quantile: float | Expr,
interpolation: RollingInterpolationMethod = 'nearest',
) Self[source]

Get quantile value.

Parameters:
quantile

Quantile between 0.0 and 1.0.

interpolation{‘nearest’, ‘higher’, ‘lower’, ‘midpoint’, ‘linear’}

Interpolation method.

Examples

>>> df = pl.DataFrame({"a": [0, 1, 2, 3, 4, 5]})
>>> df.select(pl.col("a").quantile(0.3))
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 2.0 │
└─────┘
>>> df.select(pl.col("a").quantile(0.3, interpolation="higher"))
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 2.0 │
└─────┘
>>> df.select(pl.col("a").quantile(0.3, interpolation="lower"))
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 1.0 │
└─────┘
>>> df.select(pl.col("a").quantile(0.3, interpolation="midpoint"))
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 1.5 │
└─────┘
>>> df.select(pl.col("a").quantile(0.3, interpolation="linear"))
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 1.5 │
└─────┘
radians() Self[source]

Convert from degrees to radians.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [-720, -540, -360, -180, 0, 180, 360, 540, 720]})
>>> df.select(pl.col("a").radians())
shape: (9, 1)
┌────────────┐
│ a          │
│ ---        │
│ f64        │
╞════════════╡
│ -12.566371 │
│ -9.424778  │
│ -6.283185  │
│ -3.141593  │
│ 0.0        │
│ 3.141593   │
│ 6.283185   │
│ 9.424778   │
│ 12.566371  │
└────────────┘
rank(
method: RankMethod = 'average',
*,
descending: bool = False,
seed: int | None = None,
) Self[source]

Assign ranks to data, dealing with ties appropriately.

Parameters:
method{‘average’, ‘min’, ‘max’, ‘dense’, ‘ordinal’, ‘random’}

The method used to assign ranks to tied elements. The following methods are available (default is ‘average’):

  • ‘average’ : The average of the ranks that would have been assigned to all the tied values is assigned to each value.

  • ‘min’ : The minimum of the ranks that would have been assigned to all the tied values is assigned to each value. (This is also referred to as “competition” ranking.)

  • ‘max’ : The maximum of the ranks that would have been assigned to all the tied values is assigned to each value.

  • ‘dense’ : Like ‘min’, but the rank of the next highest element is assigned the rank immediately after those assigned to the tied elements.

  • ‘ordinal’ : All values are given a distinct rank, corresponding to the order that the values occur in the Series.

  • ‘random’ : Like ‘ordinal’, but the rank for ties is not dependent on the order that the values occur in the Series.

descending

Rank in descending order.

seed

If method="random", use this as seed.

Examples

The ‘average’ method:

>>> df = pl.DataFrame({"a": [3, 6, 1, 1, 6]})
>>> df.select(pl.col("a").rank())
shape: (5, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 3.0 │
│ 4.5 │
│ 1.5 │
│ 1.5 │
│ 4.5 │
└─────┘

The ‘ordinal’ method:

>>> df = pl.DataFrame({"a": [3, 6, 1, 1, 6]})
>>> df.select(pl.col("a").rank("ordinal"))
shape: (5, 1)
┌─────┐
│ a   │
│ --- │
│ u32 │
╞═════╡
│ 3   │
│ 4   │
│ 1   │
│ 2   │
│ 5   │
└─────┘

Use ‘rank’ with ‘over’ to rank within groups:

>>> df = pl.DataFrame({"a": [1, 1, 2, 2, 2], "b": [6, 7, 5, 14, 11]})
>>> df.with_columns(pl.col("b").rank().over("a").alias("rank"))
shape: (5, 3)
┌─────┬─────┬──────┐
│ a   ┆ b   ┆ rank │
│ --- ┆ --- ┆ ---  │
│ i64 ┆ i64 ┆ f64  │
╞═════╪═════╪══════╡
│ 1   ┆ 6   ┆ 1.0  │
│ 1   ┆ 7   ┆ 2.0  │
│ 2   ┆ 5   ┆ 1.0  │
│ 2   ┆ 14  ┆ 3.0  │
│ 2   ┆ 11  ┆ 2.0  │
└─────┴─────┴──────┘
rechunk() Self[source]

Create a single chunk of memory for this Series.

Examples

>>> df = pl.DataFrame({"a": [1, 1, 2]})

Create a Series with 3 nulls, append column a then rechunk

>>> df.select(pl.repeat(None, 3).append(pl.col("a")).rechunk())
shape: (6, 1)
┌────────┐
│ repeat │
│ ---    │
│ i64    │
╞════════╡
│ null   │
│ null   │
│ null   │
│ 1      │
│ 1      │
│ 2      │
└────────┘
register_plugin(
*,
lib: str,
symbol: str,
args: list[IntoExpr] | None = None,
kwargs: dict[Any, Any] | None = None,
is_elementwise: bool = False,
input_wildcard_expansion: bool = False,
returns_scalar: bool = False,
cast_to_supertypes: bool = False,
pass_name_to_apply: bool = False,
changes_length: bool = False,
) Expr[source]

Register a plugin function.

Deprecated since version 0.20.16: Use polars.plugins.register_plugin_function() instead.

See the user guide for more information about plugins.

Parameters:
lib

Library to load.

symbol

Function to load.

args

Arguments (other than self) passed to this function. These arguments have to be of type Expression.

kwargs

Non-expression arguments. They must be JSON serializable.

is_elementwise

If the function only operates on scalars this will trigger fast paths.

input_wildcard_expansion

Expand expressions as input of this function.

returns_scalar

Automatically explode on unit length if it ran as final aggregation. this is the case for aggregations like sum, min, covariance etc.

cast_to_supertypes

Cast the input datatypes to their supertype.

pass_name_to_apply

if set, then the Series passed to the function in the group_by operation will ensure the name is set. This is an extra heap allocation per group.

changes_length

For example a unique or a slice

Warning

This method is deprecated. Use the new polars.plugins.register_plugin_function function instead.

This is highly unsafe as this will call the C function loaded by lib::symbol.

The parameters you set dictate how Polars will handle the function. Make sure they are correct!

reinterpret(*, signed: bool = True) Self[source]

Reinterpret the underlying bits as a signed/unsigned integer.

This operation is only allowed for 64bit integers. For lower bits integers, you can safely use that cast operation.

Parameters:
signed

If True, reinterpret as pl.Int64. Otherwise, reinterpret as pl.UInt64.

Examples

>>> s = pl.Series("a", [1, 1, 2], dtype=pl.UInt64)
>>> df = pl.DataFrame([s])
>>> df.select(
...     [
...         pl.col("a").reinterpret(signed=True).alias("reinterpreted"),
...         pl.col("a").alias("original"),
...     ]
... )
shape: (3, 2)
┌───────────────┬──────────┐
│ reinterpreted ┆ original │
│ ---           ┆ ---      │
│ i64           ┆ u64      │
╞═══════════════╪══════════╡
│ 1             ┆ 1        │
│ 1             ┆ 1        │
│ 2             ┆ 2        │
└───────────────┴──────────┘
repeat_by(by: Series | Expr | str | int) Self[source]

Repeat the elements in this Series as specified in the given expression.

The repeated elements are expanded into a List.

Parameters:
by

Numeric column that determines how often the values will be repeated. The column will be coerced to UInt32. Give this dtype to make the coercion a no-op.

Returns:
Expr

Expression of data type List, where the inner data type is equal to the original data type.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": ["x", "y", "z"],
...         "n": [1, 2, 3],
...     }
... )
>>> df.select(pl.col("a").repeat_by("n"))
shape: (3, 1)
┌─────────────────┐
│ a               │
│ ---             │
│ list[str]       │
╞═════════════════╡
│ ["x"]           │
│ ["y", "y"]      │
│ ["z", "z", "z"] │
└─────────────────┘
replace(
old: IntoExpr | Sequence[Any] | Mapping[Any, Any],
new: IntoExpr | Sequence[Any] | NoDefault = _NoDefault.no_default,
*,
default: IntoExpr | NoDefault = _NoDefault.no_default,
return_dtype: PolarsDataType | None = None,
) Self[source]

Replace values by different values.

Parameters:
old

Value or sequence of values to replace. Accepts expression input. Sequences are parsed as Series, other non-expression inputs are parsed as literals. Also accepts a mapping of values to their replacement as syntactic sugar for replace(old=Series(mapping.keys()), new=Series(mapping.values())).

new

Value or sequence of values to replace by. Accepts expression input. Sequences are parsed as Series, other non-expression inputs are parsed as literals. Length must match the length of old or have length 1.

default

Set values that were not replaced to this value. Defaults to keeping the original value. Accepts expression input. Non-expression inputs are parsed as literals.

return_dtype

The data type of the resulting expression. If set to None (default), the data type is determined automatically based on the other inputs.

See also

str.replace

Notes

The global string cache must be enabled when replacing categorical values.

Examples

Replace a single value by another value. Values that were not replaced remain unchanged.

>>> df = pl.DataFrame({"a": [1, 2, 2, 3]})
>>> df.with_columns(replaced=pl.col("a").replace(2, 100))
shape: (4, 2)
┌─────┬──────────┐
│ a   ┆ replaced │
│ --- ┆ ---      │
│ i64 ┆ i64      │
╞═════╪══════════╡
│ 1   ┆ 1        │
│ 2   ┆ 100      │
│ 2   ┆ 100      │
│ 3   ┆ 3        │
└─────┴──────────┘

Replace multiple values by passing sequences to the old and new parameters.

>>> df.with_columns(replaced=pl.col("a").replace([2, 3], [100, 200]))
shape: (4, 2)
┌─────┬──────────┐
│ a   ┆ replaced │
│ --- ┆ ---      │
│ i64 ┆ i64      │
╞═════╪══════════╡
│ 1   ┆ 1        │
│ 2   ┆ 100      │
│ 2   ┆ 100      │
│ 3   ┆ 200      │
└─────┴──────────┘

Passing a mapping with replacements is also supported as syntactic sugar. Specify a default to set all values that were not matched.

>>> mapping = {2: 100, 3: 200}
>>> df.with_columns(replaced=pl.col("a").replace(mapping, default=-1))
shape: (4, 2)
┌─────┬──────────┐
│ a   ┆ replaced │
│ --- ┆ ---      │
│ i64 ┆ i64      │
╞═════╪══════════╡
│ 1   ┆ -1       │
│ 2   ┆ 100      │
│ 2   ┆ 100      │
│ 3   ┆ 200      │
└─────┴──────────┘

Replacing by values of a different data type sets the return type based on a combination of the new data type and either the original data type or the default data type if it was set.

>>> df = pl.DataFrame({"a": ["x", "y", "z"]})
>>> mapping = {"x": 1, "y": 2, "z": 3}
>>> df.with_columns(replaced=pl.col("a").replace(mapping))
shape: (3, 2)
┌─────┬──────────┐
│ a   ┆ replaced │
│ --- ┆ ---      │
│ str ┆ str      │
╞═════╪══════════╡
│ x   ┆ 1        │
│ y   ┆ 2        │
│ z   ┆ 3        │
└─────┴──────────┘
>>> df.with_columns(replaced=pl.col("a").replace(mapping, default=None))
shape: (3, 2)
┌─────┬──────────┐
│ a   ┆ replaced │
│ --- ┆ ---      │
│ str ┆ i64      │
╞═════╪══════════╡
│ x   ┆ 1        │
│ y   ┆ 2        │
│ z   ┆ 3        │
└─────┴──────────┘

Set the return_dtype parameter to control the resulting data type directly.

>>> df.with_columns(
...     replaced=pl.col("a").replace(mapping, return_dtype=pl.UInt8)
... )
shape: (3, 2)
┌─────┬──────────┐
│ a   ┆ replaced │
│ --- ┆ ---      │
│ str ┆ u8       │
╞═════╪══════════╡
│ x   ┆ 1        │
│ y   ┆ 2        │
│ z   ┆ 3        │
└─────┴──────────┘

Expression input is supported for all parameters.

>>> df = pl.DataFrame({"a": [1, 2, 2, 3], "b": [1.5, 2.5, 5.0, 1.0]})
>>> df.with_columns(
...     replaced=pl.col("a").replace(
...         old=pl.col("a").max(),
...         new=pl.col("b").sum(),
...         default=pl.col("b"),
...     )
... )
shape: (4, 3)
┌─────┬─────┬──────────┐
│ a   ┆ b   ┆ replaced │
│ --- ┆ --- ┆ ---      │
│ i64 ┆ f64 ┆ f64      │
╞═════╪═════╪══════════╡
│ 1   ┆ 1.5 ┆ 1.5      │
│ 2   ┆ 2.5 ┆ 2.5      │
│ 2   ┆ 5.0 ┆ 5.0      │
│ 3   ┆ 1.0 ┆ 10.0     │
└─────┴─────┴──────────┘
reshape(dimensions: tuple[int, ...]) Self[source]

Reshape this Expr to a flat column or an Array column.

Parameters:
dimensions

Tuple of the dimension sizes. If a -1 is used in any of the dimensions, that dimension is inferred.

Returns:
Expr

If a single dimension is given, results in an expression of the original data type. If a multiple dimensions are given, results in an expression of data type Array with shape dimensions.

See also

Expr.list.explode

Explode a list column.

Examples

>>> df = pl.DataFrame({"foo": [1, 2, 3, 4, 5, 6, 7, 8, 9]})
>>> square = df.select(pl.col("foo").reshape((3, 3)))
>>> square
shape: (3, 1)
┌───────────────┐
│ foo           │
│ ---           │
│ array[i64, 3] │
╞═══════════════╡
│ [1, 2, 3]     │
│ [4, 5, 6]     │
│ [7, 8, 9]     │
└───────────────┘
>>> square.select(pl.col("foo").reshape((9,)))
shape: (9, 1)
┌─────┐
│ foo │
│ --- │
│ i64 │
╞═════╡
│ 1   │
│ 2   │
│ 3   │
│ 4   │
│ 5   │
│ 6   │
│ 7   │
│ 8   │
│ 9   │
└─────┘
reverse() Self[source]

Reverse the selection.

Examples

>>> df = pl.DataFrame(
...     {
...         "A": [1, 2, 3, 4, 5],
...         "fruits": ["banana", "banana", "apple", "apple", "banana"],
...         "B": [5, 4, 3, 2, 1],
...         "cars": ["beetle", "audi", "beetle", "beetle", "beetle"],
...     }
... )
>>> df.select(
...     [
...         pl.all(),
...         pl.all().reverse().name.suffix("_reverse"),
...     ]
... )
shape: (5, 8)
┌─────┬────────┬─────┬────────┬───────────┬────────────────┬───────────┬──────────────┐
│ A   ┆ fruits ┆ B   ┆ cars   ┆ A_reverse ┆ fruits_reverse ┆ B_reverse ┆ cars_reverse │
│ --- ┆ ---    ┆ --- ┆ ---    ┆ ---       ┆ ---            ┆ ---       ┆ ---          │
│ i64 ┆ str    ┆ i64 ┆ str    ┆ i64       ┆ str            ┆ i64       ┆ str          │
╞═════╪════════╪═════╪════════╪═══════════╪════════════════╪═══════════╪══════════════╡
│ 1   ┆ banana ┆ 5   ┆ beetle ┆ 5         ┆ banana         ┆ 1         ┆ beetle       │
│ 2   ┆ banana ┆ 4   ┆ audi   ┆ 4         ┆ apple          ┆ 2         ┆ beetle       │
│ 3   ┆ apple  ┆ 3   ┆ beetle ┆ 3         ┆ apple          ┆ 3         ┆ beetle       │
│ 4   ┆ apple  ┆ 2   ┆ beetle ┆ 2         ┆ banana         ┆ 4         ┆ audi         │
│ 5   ┆ banana ┆ 1   ┆ beetle ┆ 1         ┆ banana         ┆ 5         ┆ beetle       │
└─────┴────────┴─────┴────────┴───────────┴────────────────┴───────────┴──────────────┘
rle() Self[source]

Compress the column data using run-length encoding.

Run-length encoding (RLE) encodes data by storing each run of identical values as a single value and its length.

Returns:
Expr

Expression of data type Struct with fields len of data type UInt32 and value of the original data type.

See also

rle_id

Examples

>>> df = pl.DataFrame({"a": [1, 1, 2, 1, None, 1, 3, 3]})
>>> df.select(pl.col("a").rle()).unnest("a")
shape: (6, 2)
┌─────┬───────┐
│ len ┆ value │
│ --- ┆ ---   │
│ u32 ┆ i64   │
╞═════╪═══════╡
│ 2   ┆ 1     │
│ 1   ┆ 2     │
│ 1   ┆ 1     │
│ 1   ┆ null  │
│ 1   ┆ 1     │
│ 2   ┆ 3     │
└─────┴───────┘
rle_id() Self[source]

Get a distinct integer ID for each run of identical values.

The ID starts at 0 and increases by one each time the value of the column changes.

Returns:
Expr

Expression of data type UInt32.

See also

rle

Notes

This functionality is especially useful for defining a new group for every time a column’s value changes, rather than for every distinct value of that column.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, 1, 1, 1],
...         "b": ["x", "x", None, "y", "y"],
...     }
... )
>>> df.with_columns(
...     rle_id_a=pl.col("a").rle_id(),
...     rle_id_ab=pl.struct("a", "b").rle_id(),
... )
shape: (5, 4)
┌─────┬──────┬──────────┬───────────┐
│ a   ┆ b    ┆ rle_id_a ┆ rle_id_ab │
│ --- ┆ ---  ┆ ---      ┆ ---       │
│ i64 ┆ str  ┆ u32      ┆ u32       │
╞═════╪══════╪══════════╪═══════════╡
│ 1   ┆ x    ┆ 0        ┆ 0         │
│ 2   ┆ x    ┆ 1        ┆ 1         │
│ 1   ┆ null ┆ 2        ┆ 2         │
│ 1   ┆ y    ┆ 2        ┆ 3         │
│ 1   ┆ y    ┆ 2        ┆ 3         │
└─────┴──────┴──────────┴───────────┘
rolling(
index_column: str,
*,
period: str | timedelta,
offset: str | timedelta | None = None,
closed: ClosedInterval = 'right',
) Self[source]

Create rolling groups based on a temporal or integer column.

If you have a time series <t_0, t_1, ..., t_n>, then by default the windows created will be

  • (t_0 - period, t_0]

  • (t_1 - period, t_1]

  • (t_n - period, t_n]

whereas if you pass a non-default offset, then the windows will be

  • (t_0 + offset, t_0 + offset + period]

  • (t_1 + offset, t_1 + offset + period]

  • (t_n + offset, t_n + offset + period]

The period and offset arguments are created either from a timedelta, or by using the following string language:

  • 1ns (1 nanosecond)

  • 1us (1 microsecond)

  • 1ms (1 millisecond)

  • 1s (1 second)

  • 1m (1 minute)

  • 1h (1 hour)

  • 1d (1 calendar day)

  • 1w (1 calendar week)

  • 1mo (1 calendar month)

  • 1q (1 calendar quarter)

  • 1y (1 calendar year)

  • 1i (1 index count)

Or combine them: “3d12h4m25s” # 3 days, 12 hours, 4 minutes, and 25 seconds

By “calendar day”, we mean the corresponding time on the next day (which may not be 24 hours, due to daylight savings). Similarly for “calendar week”, “calendar month”, “calendar quarter”, and “calendar year”.

Parameters:
index_column

Column used to group based on the time window. Often of type Date/Datetime. This column must be sorted in ascending order. In case of a rolling group by on indices, dtype needs to be one of {UInt32, UInt64, Int32, Int64}. Note that the first three get temporarily cast to Int64, so if performance matters use an Int64 column.

period

Length of the window - must be non-negative.

offset

Offset of the window. Default is -period.

closed{‘right’, ‘left’, ‘both’, ‘none’}

Define which sides of the temporal interval are closed (inclusive).

Examples

>>> dates = [
...     "2020-01-01 13:45:48",
...     "2020-01-01 16:42:13",
...     "2020-01-01 16:45:09",
...     "2020-01-02 18:12:48",
...     "2020-01-03 19:45:32",
...     "2020-01-08 23:16:43",
... ]
>>> df = pl.DataFrame({"dt": dates, "a": [3, 7, 5, 9, 2, 1]}).with_columns(
...     pl.col("dt").str.strptime(pl.Datetime).set_sorted()
... )
>>> df.with_columns(
...     sum_a=pl.sum("a").rolling(index_column="dt", period="2d"),
...     min_a=pl.min("a").rolling(index_column="dt", period="2d"),
...     max_a=pl.max("a").rolling(index_column="dt", period="2d"),
... )
shape: (6, 5)
┌─────────────────────┬─────┬───────┬───────┬───────┐
│ dt                  ┆ a   ┆ sum_a ┆ min_a ┆ max_a │
│ ---                 ┆ --- ┆ ---   ┆ ---   ┆ ---   │
│ datetime[μs]        ┆ i64 ┆ i64   ┆ i64   ┆ i64   │
╞═════════════════════╪═════╪═══════╪═══════╪═══════╡
│ 2020-01-01 13:45:48 ┆ 3   ┆ 3     ┆ 3     ┆ 3     │
│ 2020-01-01 16:42:13 ┆ 7   ┆ 10    ┆ 3     ┆ 7     │
│ 2020-01-01 16:45:09 ┆ 5   ┆ 15    ┆ 3     ┆ 7     │
│ 2020-01-02 18:12:48 ┆ 9   ┆ 24    ┆ 3     ┆ 9     │
│ 2020-01-03 19:45:32 ┆ 2   ┆ 11    ┆ 2     ┆ 9     │
│ 2020-01-08 23:16:43 ┆ 1   ┆ 1     ┆ 1     ┆ 1     │
└─────────────────────┴─────┴───────┴───────┴───────┘
rolling_map(
function: Callable[[Series], Any],
window_size: int,
weights: list[float] | None = None,
*,
min_periods: int | None = None,
center: bool = False,
) Self[source]

Compute a custom rolling window function.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Parameters:
function

Custom aggregation function.

window_size

The length of the window in number of elements.

weights

An optional slice with the same length as the window that will be multiplied elementwise with the values in the window.

min_periods

The number of values in the window that should be non-null before computing a result. If set to None (default), it will be set equal to window_size.

center

Set the labels at the center of the window.

Warning

Computing custom functions is extremely slow. Use specialized rolling functions such as Expr.rolling_sum() if at all possible.

Examples

>>> from numpy import nansum
>>> df = pl.DataFrame({"a": [11.0, 2.0, 9.0, float("nan"), 8.0]})
>>> df.select(pl.col("a").rolling_map(nansum, window_size=3))
shape: (5, 1)
┌──────┐
│ a    │
│ ---  │
│ f64  │
╞══════╡
│ null │
│ null │
│ 22.0 │
│ 11.0 │
│ 17.0 │
└──────┘
rolling_max(
window_size: int,
weights: list[float] | None = None,
*,
min_periods: int | None = None,
center: bool = False,
) Self[source]

Apply a rolling max (moving max) over the values in this array.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

A window of length window_size will traverse the array. The values that fill this window will (optionally) be multiplied with the weights given by the weights vector. The resulting values will be aggregated to their max.

The window at a given row will include the row itself, and the window_size - 1 elements before it.

Parameters:
window_size

The length of the window in number of elements.

weights

An optional slice with the same length as the window that will be multiplied elementwise with the values in the window.

min_periods

The number of values in the window that should be non-null before computing a result. If set to None (default), it will be set equal to window_size.

center

Set the labels at the center of the window.

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

>>> df = pl.DataFrame({"A": [1.0, 2.0, 3.0, 4.0, 5.0, 6.0]})
>>> df.with_columns(
...     rolling_max=pl.col("A").rolling_max(window_size=2),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_max │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 2.0         │
│ 3.0 ┆ 3.0         │
│ 4.0 ┆ 4.0         │
│ 5.0 ┆ 5.0         │
│ 6.0 ┆ 6.0         │
└─────┴─────────────┘

Specify weights to multiply the values in the window with:

>>> df.with_columns(
...     rolling_max=pl.col("A").rolling_max(
...         window_size=2, weights=[0.25, 0.75]
...     ),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_max │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 1.5         │
│ 3.0 ┆ 2.25        │
│ 4.0 ┆ 3.0         │
│ 5.0 ┆ 3.75        │
│ 6.0 ┆ 4.5         │
└─────┴─────────────┘

Center the values in the window

>>> df.with_columns(
...     rolling_max=pl.col("A").rolling_max(window_size=3, center=True),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_max │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 3.0         │
│ 3.0 ┆ 4.0         │
│ 4.0 ┆ 5.0         │
│ 5.0 ┆ 6.0         │
│ 6.0 ┆ null        │
└─────┴─────────────┘
rolling_max_by(
by: IntoExpr,
window_size: timedelta | str,
*,
min_periods: int = 1,
closed: ClosedInterval = 'right',
) Self[source]

Apply a rolling max based on another column.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Given a by column <t_0, t_1, ..., t_n>, then closed="right" (the default) means the windows will be:

  • (t_0 - window_size, t_0]

  • (t_1 - window_size, t_1]

  • (t_n - window_size, t_n]

Parameters:
by

This column must be of dtype Datetime or Date.

window_size

The length of the window. Can be a dynamic temporal size indicated by a timedelta or the following string language:

  • 1ns (1 nanosecond)

  • 1us (1 microsecond)

  • 1ms (1 millisecond)

  • 1s (1 second)

  • 1m (1 minute)

  • 1h (1 hour)

  • 1d (1 calendar day)

  • 1w (1 calendar week)

  • 1mo (1 calendar month)

  • 1q (1 calendar quarter)

  • 1y (1 calendar year)

By “calendar day”, we mean the corresponding time on the next day (which may not be 24 hours, due to daylight savings). Similarly for “calendar week”, “calendar month”, “calendar quarter”, and “calendar year”.

min_periods

The number of values in the window that should be non-null before computing a result.

closed{‘left’, ‘right’, ‘both’, ‘none’}

Define which sides of the temporal interval are closed (inclusive), defaults to 'right'.

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

Create a DataFrame with a datetime column and a row number column

>>> from datetime import timedelta, datetime
>>> start = datetime(2001, 1, 1)
>>> stop = datetime(2001, 1, 2)
>>> df_temporal = pl.DataFrame(
...     {"date": pl.datetime_range(start, stop, "1h", eager=True)}
... ).with_row_index()
>>> df_temporal
shape: (25, 2)
┌───────┬─────────────────────┐
│ index ┆ date                │
│ ---   ┆ ---                 │
│ u32   ┆ datetime[μs]        │
╞═══════╪═════════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 │
│ 1     ┆ 2001-01-01 01:00:00 │
│ 2     ┆ 2001-01-01 02:00:00 │
│ 3     ┆ 2001-01-01 03:00:00 │
│ 4     ┆ 2001-01-01 04:00:00 │
│ …     ┆ …                   │
│ 20    ┆ 2001-01-01 20:00:00 │
│ 21    ┆ 2001-01-01 21:00:00 │
│ 22    ┆ 2001-01-01 22:00:00 │
│ 23    ┆ 2001-01-01 23:00:00 │
│ 24    ┆ 2001-01-02 00:00:00 │
└───────┴─────────────────────┘

Compute the rolling max with the temporal windows closed on the right (default)

>>> df_temporal.with_columns(
...     rolling_row_max=pl.col("index").rolling_max_by("date", window_size="2h")
... )
shape: (25, 3)
┌───────┬─────────────────────┬─────────────────┐
│ index ┆ date                ┆ rolling_row_max │
│ ---   ┆ ---                 ┆ ---             │
│ u32   ┆ datetime[μs]        ┆ u32             │
╞═══════╪═════════════════════╪═════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ 0               │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 1               │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 2               │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 3               │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 4               │
│ …     ┆ …                   ┆ …               │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 20              │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 21              │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 22              │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 23              │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 24              │
└───────┴─────────────────────┴─────────────────┘

Compute the rolling max with the closure of windows on both sides

>>> df_temporal.with_columns(
...     rolling_row_max=pl.col("index").rolling_max_by(
...         "date", window_size="2h", closed="both"
...     )
... )
shape: (25, 3)
┌───────┬─────────────────────┬─────────────────┐
│ index ┆ date                ┆ rolling_row_max │
│ ---   ┆ ---                 ┆ ---             │
│ u32   ┆ datetime[μs]        ┆ u32             │
╞═══════╪═════════════════════╪═════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ 0               │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 1               │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 2               │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 3               │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 4               │
│ …     ┆ …                   ┆ …               │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 20              │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 21              │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 22              │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 23              │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 24              │
└───────┴─────────────────────┴─────────────────┘
rolling_mean(
window_size: int,
weights: list[float] | None = None,
*,
min_periods: int | None = None,
center: bool = False,
) Self[source]

Apply a rolling mean (moving mean) over the values in this array.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

A window of length window_size will traverse the array. The values that fill this window will (optionally) be multiplied with the weights given by the weights vector. The resulting values will be aggregated to their mean.

The window at a given row will include the row itself, and the window_size - 1 elements before it.

Parameters:
window_size

The length of the window in number of elements.

weights

An optional slice with the same length as the window that will be multiplied elementwise with the values in the window.

min_periods

The number of values in the window that should be non-null before computing a result. If set to None (default), it will be set equal to window_size.

center

Set the labels at the center of the window.

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

>>> df = pl.DataFrame({"A": [1.0, 2.0, 3.0, 4.0, 5.0, 6.0]})
>>> df.with_columns(
...     rolling_mean=pl.col("A").rolling_mean(window_size=2),
... )
shape: (6, 2)
┌─────┬──────────────┐
│ A   ┆ rolling_mean │
│ --- ┆ ---          │
│ f64 ┆ f64          │
╞═════╪══════════════╡
│ 1.0 ┆ null         │
│ 2.0 ┆ 1.5          │
│ 3.0 ┆ 2.5          │
│ 4.0 ┆ 3.5          │
│ 5.0 ┆ 4.5          │
│ 6.0 ┆ 5.5          │
└─────┴──────────────┘

Specify weights to multiply the values in the window with:

>>> df.with_columns(
...     rolling_mean=pl.col("A").rolling_mean(
...         window_size=2, weights=[0.25, 0.75]
...     ),
... )
shape: (6, 2)
┌─────┬──────────────┐
│ A   ┆ rolling_mean │
│ --- ┆ ---          │
│ f64 ┆ f64          │
╞═════╪══════════════╡
│ 1.0 ┆ null         │
│ 2.0 ┆ 1.75         │
│ 3.0 ┆ 2.75         │
│ 4.0 ┆ 3.75         │
│ 5.0 ┆ 4.75         │
│ 6.0 ┆ 5.75         │
└─────┴──────────────┘

Center the values in the window

>>> df.with_columns(
...     rolling_mean=pl.col("A").rolling_mean(window_size=3, center=True),
... )
shape: (6, 2)
┌─────┬──────────────┐
│ A   ┆ rolling_mean │
│ --- ┆ ---          │
│ f64 ┆ f64          │
╞═════╪══════════════╡
│ 1.0 ┆ null         │
│ 2.0 ┆ 2.0          │
│ 3.0 ┆ 3.0          │
│ 4.0 ┆ 4.0          │
│ 5.0 ┆ 5.0          │
│ 6.0 ┆ null         │
└─────┴──────────────┘
rolling_mean_by(
by: IntoExpr,
window_size: timedelta | str,
*,
min_periods: int = 1,
closed: ClosedInterval = 'right',
) Self[source]

Apply a rolling mean based on another column.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Given a by column <t_0, t_1, ..., t_n>, then closed="right" (the default) means the windows will be:

  • (t_0 - window_size, t_0]

  • (t_1 - window_size, t_1]

  • (t_n - window_size, t_n]

Parameters:
by

This column must be of dtype Datetime or Date.

window_size

The length of the window. Can be a dynamic temporal size indicated by a timedelta or the following string language:

  • 1ns (1 nanosecond)

  • 1us (1 microsecond)

  • 1ms (1 millisecond)

  • 1s (1 second)

  • 1m (1 minute)

  • 1h (1 hour)

  • 1d (1 calendar day)

  • 1w (1 calendar week)

  • 1mo (1 calendar month)

  • 1q (1 calendar quarter)

  • 1y (1 calendar year)

By “calendar day”, we mean the corresponding time on the next day (which may not be 24 hours, due to daylight savings). Similarly for “calendar week”, “calendar month”, “calendar quarter”, and “calendar year”.

min_periods

The number of values in the window that should be non-null before computing a result.

closed{‘left’, ‘right’, ‘both’, ‘none’}

Define which sides of the temporal interval are closed (inclusive), defaults to 'right'.

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

Create a DataFrame with a datetime column and a row number column

>>> from datetime import timedelta, datetime
>>> start = datetime(2001, 1, 1)
>>> stop = datetime(2001, 1, 2)
>>> df_temporal = pl.DataFrame(
...     {"date": pl.datetime_range(start, stop, "1h", eager=True)}
... ).with_row_index()
>>> df_temporal
shape: (25, 2)
┌───────┬─────────────────────┐
│ index ┆ date                │
│ ---   ┆ ---                 │
│ u32   ┆ datetime[μs]        │
╞═══════╪═════════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 │
│ 1     ┆ 2001-01-01 01:00:00 │
│ 2     ┆ 2001-01-01 02:00:00 │
│ 3     ┆ 2001-01-01 03:00:00 │
│ 4     ┆ 2001-01-01 04:00:00 │
│ …     ┆ …                   │
│ 20    ┆ 2001-01-01 20:00:00 │
│ 21    ┆ 2001-01-01 21:00:00 │
│ 22    ┆ 2001-01-01 22:00:00 │
│ 23    ┆ 2001-01-01 23:00:00 │
│ 24    ┆ 2001-01-02 00:00:00 │
└───────┴─────────────────────┘

Compute the rolling mean with the temporal windows closed on the right (default)

>>> df_temporal.with_columns(
...     rolling_row_mean=pl.col("index").rolling_mean_by(
...         "date", window_size="2h"
...     )
... )
shape: (25, 3)
┌───────┬─────────────────────┬──────────────────┐
│ index ┆ date                ┆ rolling_row_mean │
│ ---   ┆ ---                 ┆ ---              │
│ u32   ┆ datetime[μs]        ┆ f64              │
╞═══════╪═════════════════════╪══════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ 0.0              │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 0.5              │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 1.5              │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 2.5              │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 3.5              │
│ …     ┆ …                   ┆ …                │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 19.5             │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 20.5             │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 21.5             │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 22.5             │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 23.5             │
└───────┴─────────────────────┴──────────────────┘

Compute the rolling mean with the closure of windows on both sides

>>> df_temporal.with_columns(
...     rolling_row_mean=pl.col("index").rolling_mean_by(
...         "date", window_size="2h", closed="both"
...     )
... )
shape: (25, 3)
┌───────┬─────────────────────┬──────────────────┐
│ index ┆ date                ┆ rolling_row_mean │
│ ---   ┆ ---                 ┆ ---              │
│ u32   ┆ datetime[μs]        ┆ f64              │
╞═══════╪═════════════════════╪══════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ 0.0              │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 0.5              │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 1.0              │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 2.0              │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 3.0              │
│ …     ┆ …                   ┆ …                │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 19.0             │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 20.0             │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 21.0             │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 22.0             │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 23.0             │
└───────┴─────────────────────┴──────────────────┘
rolling_median(
window_size: int | timedelta,
weights: list[float] | None = None,
*,
min_periods: int | None = None,
center: bool = False,
) Self[source]

Compute a rolling median.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

A window of length window_size will traverse the array. The values that fill this window will (optionally) be multiplied with the weights given by the weights vector. The resulting values will be aggregated to their median.

The window at a given row will include the row itself, and the window_size - 1 elements before it.

Parameters:
window_size

The length of the window in number of elements.

weights

An optional slice with the same length as the window that will be multiplied elementwise with the values in the window.

min_periods

The number of values in the window that should be non-null before computing a result. If set to None (default), it will be set equal to window_size.

center

Set the labels at the center of the window.

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

>>> df = pl.DataFrame({"A": [1.0, 2.0, 3.0, 4.0, 5.0, 6.0]})
>>> df.with_columns(
...     rolling_median=pl.col("A").rolling_median(window_size=2),
... )
shape: (6, 2)
┌─────┬────────────────┐
│ A   ┆ rolling_median │
│ --- ┆ ---            │
│ f64 ┆ f64            │
╞═════╪════════════════╡
│ 1.0 ┆ null           │
│ 2.0 ┆ 1.5            │
│ 3.0 ┆ 2.5            │
│ 4.0 ┆ 3.5            │
│ 5.0 ┆ 4.5            │
│ 6.0 ┆ 5.5            │
└─────┴────────────────┘

Specify weights for the values in each window:

>>> df.with_columns(
...     rolling_median=pl.col("A").rolling_median(
...         window_size=2, weights=[0.25, 0.75]
...     ),
... )
shape: (6, 2)
┌─────┬────────────────┐
│ A   ┆ rolling_median │
│ --- ┆ ---            │
│ f64 ┆ f64            │
╞═════╪════════════════╡
│ 1.0 ┆ null           │
│ 2.0 ┆ 1.5            │
│ 3.0 ┆ 2.5            │
│ 4.0 ┆ 3.5            │
│ 5.0 ┆ 4.5            │
│ 6.0 ┆ 5.5            │
└─────┴────────────────┘

Center the values in the window

>>> df.with_columns(
...     rolling_median=pl.col("A").rolling_median(window_size=3, center=True),
... )
shape: (6, 2)
┌─────┬────────────────┐
│ A   ┆ rolling_median │
│ --- ┆ ---            │
│ f64 ┆ f64            │
╞═════╪════════════════╡
│ 1.0 ┆ null           │
│ 2.0 ┆ 2.0            │
│ 3.0 ┆ 3.0            │
│ 4.0 ┆ 4.0            │
│ 5.0 ┆ 5.0            │
│ 6.0 ┆ null           │
└─────┴────────────────┘
rolling_median_by(
by: IntoExpr,
window_size: timedelta | str,
*,
min_periods: int = 1,
closed: ClosedInterval = 'right',
) Self[source]

Compute a rolling median based on another column.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Given a by column <t_0, t_1, ..., t_n>, then closed="right" (the default) means the windows will be:

  • (t_0 - window_size, t_0]

  • (t_1 - window_size, t_1]

  • (t_n - window_size, t_n]

Parameters:
by

This column must be of dtype Datetime or Date.

window_size

The length of the window. Can be a dynamic temporal size indicated by a timedelta or the following string language:

  • 1ns (1 nanosecond)

  • 1us (1 microsecond)

  • 1ms (1 millisecond)

  • 1s (1 second)

  • 1m (1 minute)

  • 1h (1 hour)

  • 1d (1 calendar day)

  • 1w (1 calendar week)

  • 1mo (1 calendar month)

  • 1q (1 calendar quarter)

  • 1y (1 calendar year)

By “calendar day”, we mean the corresponding time on the next day (which may not be 24 hours, due to daylight savings). Similarly for “calendar week”, “calendar month”, “calendar quarter”, and “calendar year”.

min_periods

The number of values in the window that should be non-null before computing a result.

closed{‘left’, ‘right’, ‘both’, ‘none’}

Define which sides of the temporal interval are closed (inclusive), defaults to 'right'.

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

Create a DataFrame with a datetime column and a row number column

>>> from datetime import timedelta, datetime
>>> start = datetime(2001, 1, 1)
>>> stop = datetime(2001, 1, 2)
>>> df_temporal = pl.DataFrame(
...     {"date": pl.datetime_range(start, stop, "1h", eager=True)}
... ).with_row_index()
>>> df_temporal
shape: (25, 2)
┌───────┬─────────────────────┐
│ index ┆ date                │
│ ---   ┆ ---                 │
│ u32   ┆ datetime[μs]        │
╞═══════╪═════════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 │
│ 1     ┆ 2001-01-01 01:00:00 │
│ 2     ┆ 2001-01-01 02:00:00 │
│ 3     ┆ 2001-01-01 03:00:00 │
│ 4     ┆ 2001-01-01 04:00:00 │
│ …     ┆ …                   │
│ 20    ┆ 2001-01-01 20:00:00 │
│ 21    ┆ 2001-01-01 21:00:00 │
│ 22    ┆ 2001-01-01 22:00:00 │
│ 23    ┆ 2001-01-01 23:00:00 │
│ 24    ┆ 2001-01-02 00:00:00 │
└───────┴─────────────────────┘

Compute the rolling median with the temporal windows closed on the right:

>>> df_temporal.with_columns(
...     rolling_row_median=pl.col("index").rolling_median_by(
...         "date", window_size="2h"
...     )
... )
shape: (25, 3)
┌───────┬─────────────────────┬────────────────────┐
│ index ┆ date                ┆ rolling_row_median │
│ ---   ┆ ---                 ┆ ---                │
│ u32   ┆ datetime[μs]        ┆ f64                │
╞═══════╪═════════════════════╪════════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ 0.0                │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 0.5                │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 1.5                │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 2.5                │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 3.5                │
│ …     ┆ …                   ┆ …                  │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 19.5               │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 20.5               │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 21.5               │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 22.5               │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 23.5               │
└───────┴─────────────────────┴────────────────────┘
rolling_min(
window_size: int,
weights: list[float] | None = None,
*,
min_periods: int | None = None,
center: bool = False,
) Self[source]

Apply a rolling min (moving min) over the values in this array.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

A window of length window_size will traverse the array. The values that fill this window will (optionally) be multiplied with the weights given by the weights vector. The resulting values will be aggregated to their min.

The window at a given row will include the row itself, and the window_size - 1 elements before it.

Parameters:
window_size

The length of the window in number of elements.

weights

An optional slice with the same length as the window that will be multiplied elementwise with the values in the window.

min_periods

The number of values in the window that should be non-null before computing a result. If set to None (default), it will be set equal to window_size.

center

Set the labels at the center of the window.

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

>>> df = pl.DataFrame({"A": [1.0, 2.0, 3.0, 4.0, 5.0, 6.0]})
>>> df.with_columns(
...     rolling_min=pl.col("A").rolling_min(window_size=2),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_min │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 1.0         │
│ 3.0 ┆ 2.0         │
│ 4.0 ┆ 3.0         │
│ 5.0 ┆ 4.0         │
│ 6.0 ┆ 5.0         │
└─────┴─────────────┘

Specify weights to multiply the values in the window with:

>>> df.with_columns(
...     rolling_min=pl.col("A").rolling_min(
...         window_size=2, weights=[0.25, 0.75]
...     ),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_min │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 0.25        │
│ 3.0 ┆ 0.5         │
│ 4.0 ┆ 0.75        │
│ 5.0 ┆ 1.0         │
│ 6.0 ┆ 1.25        │
└─────┴─────────────┘

Center the values in the window

>>> df.with_columns(
...     rolling_min=pl.col("A").rolling_min(window_size=3, center=True),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_min │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 1.0         │
│ 3.0 ┆ 2.0         │
│ 4.0 ┆ 3.0         │
│ 5.0 ┆ 4.0         │
│ 6.0 ┆ null        │
└─────┴─────────────┘
rolling_min_by(
by: IntoExpr,
window_size: timedelta | str,
*,
min_periods: int = 1,
closed: ClosedInterval = 'right',
) Self[source]

Apply a rolling min based on another column.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Given a by column <t_0, t_1, ..., t_n>, then closed="right" (the default) means the windows will be:

  • (t_0 - window_size, t_0]

  • (t_1 - window_size, t_1]

  • (t_n - window_size, t_n]

Parameters:
by

This column must be of dtype Datetime or Date.

window_size

The length of the window. Can be a dynamic temporal size indicated by a timedelta or the following string language:

  • 1ns (1 nanosecond)

  • 1us (1 microsecond)

  • 1ms (1 millisecond)

  • 1s (1 second)

  • 1m (1 minute)

  • 1h (1 hour)

  • 1d (1 calendar day)

  • 1w (1 calendar week)

  • 1mo (1 calendar month)

  • 1q (1 calendar quarter)

  • 1y (1 calendar year)

By “calendar day”, we mean the corresponding time on the next day (which may not be 24 hours, due to daylight savings). Similarly for “calendar week”, “calendar month”, “calendar quarter”, and “calendar year”.

min_periods

The number of values in the window that should be non-null before computing a result.

closed{‘left’, ‘right’, ‘both’, ‘none’}

Define which sides of the temporal interval are closed (inclusive), defaults to 'right'.

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

Create a DataFrame with a datetime column and a row number column

>>> from datetime import timedelta, datetime
>>> start = datetime(2001, 1, 1)
>>> stop = datetime(2001, 1, 2)
>>> df_temporal = pl.DataFrame(
...     {"date": pl.datetime_range(start, stop, "1h", eager=True)}
... ).with_row_index()
>>> df_temporal
shape: (25, 2)
┌───────┬─────────────────────┐
│ index ┆ date                │
│ ---   ┆ ---                 │
│ u32   ┆ datetime[μs]        │
╞═══════╪═════════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 │
│ 1     ┆ 2001-01-01 01:00:00 │
│ 2     ┆ 2001-01-01 02:00:00 │
│ 3     ┆ 2001-01-01 03:00:00 │
│ 4     ┆ 2001-01-01 04:00:00 │
│ …     ┆ …                   │
│ 20    ┆ 2001-01-01 20:00:00 │
│ 21    ┆ 2001-01-01 21:00:00 │
│ 22    ┆ 2001-01-01 22:00:00 │
│ 23    ┆ 2001-01-01 23:00:00 │
│ 24    ┆ 2001-01-02 00:00:00 │
└───────┴─────────────────────┘

Compute the rolling min with the temporal windows closed on the right (default)

>>> df_temporal.with_columns(
...     rolling_row_min=pl.col("index").rolling_min_by("date", window_size="2h")
... )
shape: (25, 3)
┌───────┬─────────────────────┬─────────────────┐
│ index ┆ date                ┆ rolling_row_min │
│ ---   ┆ ---                 ┆ ---             │
│ u32   ┆ datetime[μs]        ┆ u32             │
╞═══════╪═════════════════════╪═════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ 0               │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 0               │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 1               │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 2               │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 3               │
│ …     ┆ …                   ┆ …               │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 19              │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 20              │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 21              │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 22              │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 23              │
└───────┴─────────────────────┴─────────────────┘
rolling_quantile(
quantile: float,
interpolation: RollingInterpolationMethod = 'nearest',
window_size: int | timedelta = 2,
weights: list[float] | None = None,
*,
min_periods: int | None = None,
center: bool = False,
) Self[source]

Compute a rolling quantile.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

A window of length window_size will traverse the array. The values that fill this window will (optionally) be multiplied with the weights given by the weights vector. The resulting values will be aggregated to their quantile.

The window at a given row will include the row itself, and the window_size - 1 elements before it.

Parameters:
quantile

Quantile between 0.0 and 1.0.

interpolation{‘nearest’, ‘higher’, ‘lower’, ‘midpoint’, ‘linear’}

Interpolation method.

window_size

The length of the window in number of elements.

weights

An optional slice with the same length as the window that will be multiplied elementwise with the values in the window.

min_periods

The number of values in the window that should be non-null before computing a result. If set to None (default), it will be set equal to window_size.

center

Set the labels at the center of the window.

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

>>> df = pl.DataFrame({"A": [1.0, 2.0, 3.0, 4.0, 5.0, 6.0]})
>>> df.with_columns(
...     rolling_quantile=pl.col("A").rolling_quantile(
...         quantile=0.25, window_size=4
...     ),
... )
shape: (6, 2)
┌─────┬──────────────────┐
│ A   ┆ rolling_quantile │
│ --- ┆ ---              │
│ f64 ┆ f64              │
╞═════╪══════════════════╡
│ 1.0 ┆ null             │
│ 2.0 ┆ null             │
│ 3.0 ┆ null             │
│ 4.0 ┆ 2.0              │
│ 5.0 ┆ 3.0              │
│ 6.0 ┆ 4.0              │
└─────┴──────────────────┘

Specify weights for the values in each window:

>>> df.with_columns(
...     rolling_quantile=pl.col("A").rolling_quantile(
...         quantile=0.25, window_size=4, weights=[0.2, 0.4, 0.4, 0.2]
...     ),
... )
shape: (6, 2)
┌─────┬──────────────────┐
│ A   ┆ rolling_quantile │
│ --- ┆ ---              │
│ f64 ┆ f64              │
╞═════╪══════════════════╡
│ 1.0 ┆ null             │
│ 2.0 ┆ null             │
│ 3.0 ┆ null             │
│ 4.0 ┆ 2.0              │
│ 5.0 ┆ 3.0              │
│ 6.0 ┆ 4.0              │
└─────┴──────────────────┘

Specify weights and interpolation method

>>> df.with_columns(
...     rolling_quantile=pl.col("A").rolling_quantile(
...         quantile=0.25,
...         window_size=4,
...         weights=[0.2, 0.4, 0.4, 0.2],
...         interpolation="linear",
...     ),
... )
shape: (6, 2)
┌─────┬──────────────────┐
│ A   ┆ rolling_quantile │
│ --- ┆ ---              │
│ f64 ┆ f64              │
╞═════╪══════════════════╡
│ 1.0 ┆ null             │
│ 2.0 ┆ null             │
│ 3.0 ┆ null             │
│ 4.0 ┆ 1.625            │
│ 5.0 ┆ 2.625            │
│ 6.0 ┆ 3.625            │
└─────┴──────────────────┘

Center the values in the window

>>> df.with_columns(
...     rolling_quantile=pl.col("A").rolling_quantile(
...         quantile=0.2, window_size=5, center=True
...     ),
... )
shape: (6, 2)
┌─────┬──────────────────┐
│ A   ┆ rolling_quantile │
│ --- ┆ ---              │
│ f64 ┆ f64              │
╞═════╪══════════════════╡
│ 1.0 ┆ null             │
│ 2.0 ┆ null             │
│ 3.0 ┆ 2.0              │
│ 4.0 ┆ 3.0              │
│ 5.0 ┆ null             │
│ 6.0 ┆ null             │
└─────┴──────────────────┘
rolling_quantile_by(
by: IntoExpr,
window_size: timedelta | str,
*,
quantile: float,
interpolation: RollingInterpolationMethod = 'nearest',
min_periods: int = 1,
closed: ClosedInterval = 'right',
) Self[source]

Compute a rolling quantile based on another column.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Given a by column <t_0, t_1, ..., t_n>, then closed="right" (the default) means the windows will be:

  • (t_0 - window_size, t_0]

  • (t_1 - window_size, t_1]

  • (t_n - window_size, t_n]

Parameters:
by

This column must be of dtype Datetime or Date.

quantile

Quantile between 0.0 and 1.0.

interpolation{‘nearest’, ‘higher’, ‘lower’, ‘midpoint’, ‘linear’}

Interpolation method.

window_size

The length of the window. Can be a dynamic temporal size indicated by a timedelta or the following string language:

  • 1ns (1 nanosecond)

  • 1us (1 microsecond)

  • 1ms (1 millisecond)

  • 1s (1 second)

  • 1m (1 minute)

  • 1h (1 hour)

  • 1d (1 calendar day)

  • 1w (1 calendar week)

  • 1mo (1 calendar month)

  • 1q (1 calendar quarter)

  • 1y (1 calendar year)

By “calendar day”, we mean the corresponding time on the next day (which may not be 24 hours, due to daylight savings). Similarly for “calendar week”, “calendar month”, “calendar quarter”, and “calendar year”.

min_periods

The number of values in the window that should be non-null before computing a result.

closed{‘left’, ‘right’, ‘both’, ‘none’}

Define which sides of the temporal interval are closed (inclusive), defaults to 'right'.

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

Create a DataFrame with a datetime column and a row number column

>>> from datetime import timedelta, datetime
>>> start = datetime(2001, 1, 1)
>>> stop = datetime(2001, 1, 2)
>>> df_temporal = pl.DataFrame(
...     {"date": pl.datetime_range(start, stop, "1h", eager=True)}
... ).with_row_index()
>>> df_temporal
shape: (25, 2)
┌───────┬─────────────────────┐
│ index ┆ date                │
│ ---   ┆ ---                 │
│ u32   ┆ datetime[μs]        │
╞═══════╪═════════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 │
│ 1     ┆ 2001-01-01 01:00:00 │
│ 2     ┆ 2001-01-01 02:00:00 │
│ 3     ┆ 2001-01-01 03:00:00 │
│ 4     ┆ 2001-01-01 04:00:00 │
│ …     ┆ …                   │
│ 20    ┆ 2001-01-01 20:00:00 │
│ 21    ┆ 2001-01-01 21:00:00 │
│ 22    ┆ 2001-01-01 22:00:00 │
│ 23    ┆ 2001-01-01 23:00:00 │
│ 24    ┆ 2001-01-02 00:00:00 │
└───────┴─────────────────────┘

Compute the rolling quantile with the temporal windows closed on the right:

>>> df_temporal.with_columns(
...     rolling_row_quantile=pl.col("index").rolling_quantile_by(
...         "date", window_size="2h", quantile=0.3
...     )
... )
shape: (25, 3)
┌───────┬─────────────────────┬──────────────────────┐
│ index ┆ date                ┆ rolling_row_quantile │
│ ---   ┆ ---                 ┆ ---                  │
│ u32   ┆ datetime[μs]        ┆ f64                  │
╞═══════╪═════════════════════╪══════════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ 0.0                  │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 0.0                  │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 1.0                  │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 2.0                  │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 3.0                  │
│ …     ┆ …                   ┆ …                    │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 19.0                 │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 20.0                 │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 21.0                 │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 22.0                 │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 23.0                 │
└───────┴─────────────────────┴──────────────────────┘
rolling_skew(window_size: int, *, bias: bool = True) Self[source]

Compute a rolling skew.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

The window at a given row will include the row itself, and the window_size - 1 elements before it.

Parameters:
window_size

Integer size of the rolling window.

bias

If False, the calculations are corrected for statistical bias.

Examples

>>> df = pl.DataFrame({"a": [1, 4, 2, 9]})
>>> df.select(pl.col("a").rolling_skew(3))
shape: (4, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ null     │
│ null     │
│ 0.381802 │
│ 0.47033  │
└──────────┘

Note how the values match the following:

>>> pl.Series([1, 4, 2]).skew(), pl.Series([4, 2, 9]).skew()
(0.38180177416060584, 0.47033046033698594)
rolling_std(
window_size: int | timedelta,
weights: list[float] | None = None,
*,
min_periods: int | None = None,
center: bool = False,
ddof: int = 1,
) Self[source]

Compute a rolling standard deviation.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

A window of length window_size will traverse the array. The values that fill this window will (optionally) be multiplied with the weights given by the weights vector. The resulting values will be aggregated to their std.

The window at a given row will include the row itself, and the window_size - 1 elements before it.

Parameters:
window_size

The length of the window in number of elements.

weights

An optional slice with the same length as the window that will be multiplied elementwise with the values in the window.

min_periods

The number of values in the window that should be non-null before computing a result. If set to None (default), it will be set equal to window_size.

center

Set the labels at the center of the window.

ddof

“Delta Degrees of Freedom”: The divisor for a length N window is N - ddof

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

>>> df = pl.DataFrame({"A": [1.0, 2.0, 3.0, 4.0, 5.0, 6.0]})
>>> df.with_columns(
...     rolling_std=pl.col("A").rolling_std(window_size=2),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_std │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 0.707107    │
│ 3.0 ┆ 0.707107    │
│ 4.0 ┆ 0.707107    │
│ 5.0 ┆ 0.707107    │
│ 6.0 ┆ 0.707107    │
└─────┴─────────────┘

Specify weights to multiply the values in the window with:

>>> df.with_columns(
...     rolling_std=pl.col("A").rolling_std(
...         window_size=2, weights=[0.25, 0.75]
...     ),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_std │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 0.433013    │
│ 3.0 ┆ 0.433013    │
│ 4.0 ┆ 0.433013    │
│ 5.0 ┆ 0.433013    │
│ 6.0 ┆ 0.433013    │
└─────┴─────────────┘

Center the values in the window

>>> df.with_columns(
...     rolling_std=pl.col("A").rolling_std(window_size=3, center=True),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_std │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 1.0         │
│ 3.0 ┆ 1.0         │
│ 4.0 ┆ 1.0         │
│ 5.0 ┆ 1.0         │
│ 6.0 ┆ null        │
└─────┴─────────────┘
rolling_std_by(
by: IntoExpr,
window_size: timedelta | str,
*,
min_periods: int = 1,
closed: ClosedInterval = 'right',
ddof: int = 1,
) Self[source]

Compute a rolling standard deviation based on another column.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Given a by column <t_0, t_1, ..., t_n>, then closed="right" (the default) means the windows will be:

  • (t_0 - window_size, t_0]

  • (t_1 - window_size, t_1]

  • (t_n - window_size, t_n]

Parameters:
by

This column must be of dtype Datetime or Date.

window_size

The length of the window. Can be a dynamic temporal size indicated by a timedelta or the following string language:

  • 1ns (1 nanosecond)

  • 1us (1 microsecond)

  • 1ms (1 millisecond)

  • 1s (1 second)

  • 1m (1 minute)

  • 1h (1 hour)

  • 1d (1 calendar day)

  • 1w (1 calendar week)

  • 1mo (1 calendar month)

  • 1q (1 calendar quarter)

  • 1y (1 calendar year)

By “calendar day”, we mean the corresponding time on the next day (which may not be 24 hours, due to daylight savings). Similarly for “calendar week”, “calendar month”, “calendar quarter”, and “calendar year”.

min_periods

The number of values in the window that should be non-null before computing a result.

closed{‘left’, ‘right’, ‘both’, ‘none’}

Define which sides of the temporal interval are closed (inclusive), defaults to 'right'.

ddof

“Delta Degrees of Freedom”: The divisor for a length N window is N - ddof

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

Create a DataFrame with a datetime column and a row number column

>>> from datetime import timedelta, datetime
>>> start = datetime(2001, 1, 1)
>>> stop = datetime(2001, 1, 2)
>>> df_temporal = pl.DataFrame(
...     {"date": pl.datetime_range(start, stop, "1h", eager=True)}
... ).with_row_index()
>>> df_temporal
shape: (25, 2)
┌───────┬─────────────────────┐
│ index ┆ date                │
│ ---   ┆ ---                 │
│ u32   ┆ datetime[μs]        │
╞═══════╪═════════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 │
│ 1     ┆ 2001-01-01 01:00:00 │
│ 2     ┆ 2001-01-01 02:00:00 │
│ 3     ┆ 2001-01-01 03:00:00 │
│ 4     ┆ 2001-01-01 04:00:00 │
│ …     ┆ …                   │
│ 20    ┆ 2001-01-01 20:00:00 │
│ 21    ┆ 2001-01-01 21:00:00 │
│ 22    ┆ 2001-01-01 22:00:00 │
│ 23    ┆ 2001-01-01 23:00:00 │
│ 24    ┆ 2001-01-02 00:00:00 │
└───────┴─────────────────────┘

Compute the rolling std with the temporal windows closed on the right (default)

>>> df_temporal.with_columns(
...     rolling_row_std=pl.col("index").rolling_std_by("date", window_size="2h")
... )
shape: (25, 3)
┌───────┬─────────────────────┬─────────────────┐
│ index ┆ date                ┆ rolling_row_std │
│ ---   ┆ ---                 ┆ ---             │
│ u32   ┆ datetime[μs]        ┆ f64             │
╞═══════╪═════════════════════╪═════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ null            │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 0.707107        │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 0.707107        │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 0.707107        │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 0.707107        │
│ …     ┆ …                   ┆ …               │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 0.707107        │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 0.707107        │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 0.707107        │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 0.707107        │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 0.707107        │
└───────┴─────────────────────┴─────────────────┘

Compute the rolling std with the closure of windows on both sides

>>> df_temporal.with_columns(
...     rolling_row_std=pl.col("index").rolling_std_by(
...         "date", window_size="2h", closed="both"
...     )
... )
shape: (25, 3)
┌───────┬─────────────────────┬─────────────────┐
│ index ┆ date                ┆ rolling_row_std │
│ ---   ┆ ---                 ┆ ---             │
│ u32   ┆ datetime[μs]        ┆ f64             │
╞═══════╪═════════════════════╪═════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ null            │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 0.707107        │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 1.0             │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 1.0             │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 1.0             │
│ …     ┆ …                   ┆ …               │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 1.0             │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 1.0             │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 1.0             │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 1.0             │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 1.0             │
└───────┴─────────────────────┴─────────────────┘
rolling_sum(
window_size: int | timedelta,
weights: list[float] | None = None,
*,
min_periods: int | None = None,
center: bool = False,
) Self[source]

Apply a rolling sum (moving sum) over the values in this array.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

A window of length window_size will traverse the array. The values that fill this window will (optionally) be multiplied with the weights given by the weights vector. The resulting values will be aggregated to their sum.

The window at a given row will include the row itself, and the window_size - 1 elements before it.

Parameters:
window_size

The length of the window in number of elements.

weights

An optional slice with the same length as the window that will be multiplied elementwise with the values in the window.

min_periods

The number of values in the window that should be non-null before computing a result. If set to None (default), it will be set equal to window_size.

center

Set the labels at the center of the window.

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

>>> df = pl.DataFrame({"A": [1.0, 2.0, 3.0, 4.0, 5.0, 6.0]})
>>> df.with_columns(
...     rolling_sum=pl.col("A").rolling_sum(window_size=2),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_sum │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 3.0         │
│ 3.0 ┆ 5.0         │
│ 4.0 ┆ 7.0         │
│ 5.0 ┆ 9.0         │
│ 6.0 ┆ 11.0        │
└─────┴─────────────┘

Specify weights to multiply the values in the window with:

>>> df.with_columns(
...     rolling_sum=pl.col("A").rolling_sum(
...         window_size=2, weights=[0.25, 0.75]
...     ),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_sum │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 1.75        │
│ 3.0 ┆ 2.75        │
│ 4.0 ┆ 3.75        │
│ 5.0 ┆ 4.75        │
│ 6.0 ┆ 5.75        │
└─────┴─────────────┘

Center the values in the window

>>> df.with_columns(
...     rolling_sum=pl.col("A").rolling_sum(window_size=3, center=True),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_sum │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 6.0         │
│ 3.0 ┆ 9.0         │
│ 4.0 ┆ 12.0        │
│ 5.0 ┆ 15.0        │
│ 6.0 ┆ null        │
└─────┴─────────────┘
rolling_sum_by(
by: IntoExpr,
window_size: timedelta | str,
*,
min_periods: int = 1,
closed: ClosedInterval = 'right',
) Self[source]

Apply a rolling sum based on another column.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Given a by column <t_0, t_1, ..., t_n>, then closed="right" (the default) means the windows will be:

  • (t_0 - window_size, t_0]

  • (t_1 - window_size, t_1]

  • (t_n - window_size, t_n]

Parameters:
window_size

The length of the window. Can be a dynamic temporal size indicated by a timedelta or the following string language:

  • 1ns (1 nanosecond)

  • 1us (1 microsecond)

  • 1ms (1 millisecond)

  • 1s (1 second)

  • 1m (1 minute)

  • 1h (1 hour)

  • 1d (1 calendar day)

  • 1w (1 calendar week)

  • 1mo (1 calendar month)

  • 1q (1 calendar quarter)

  • 1y (1 calendar year)

By “calendar day”, we mean the corresponding time on the next day (which may not be 24 hours, due to daylight savings). Similarly for “calendar week”, “calendar month”, “calendar quarter”, and “calendar year”.

min_periods

The number of values in the window that should be non-null before computing a result.

by

This column must of dtype {Date, Datetime}

closed{‘left’, ‘right’, ‘both’, ‘none’}

Define which sides of the temporal interval are closed (inclusive), defaults to 'right'.

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

Create a DataFrame with a datetime column and a row number column

>>> from datetime import timedelta, datetime
>>> start = datetime(2001, 1, 1)
>>> stop = datetime(2001, 1, 2)
>>> df_temporal = pl.DataFrame(
...     {"date": pl.datetime_range(start, stop, "1h", eager=True)}
... ).with_row_index()
>>> df_temporal
shape: (25, 2)
┌───────┬─────────────────────┐
│ index ┆ date                │
│ ---   ┆ ---                 │
│ u32   ┆ datetime[μs]        │
╞═══════╪═════════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 │
│ 1     ┆ 2001-01-01 01:00:00 │
│ 2     ┆ 2001-01-01 02:00:00 │
│ 3     ┆ 2001-01-01 03:00:00 │
│ 4     ┆ 2001-01-01 04:00:00 │
│ …     ┆ …                   │
│ 20    ┆ 2001-01-01 20:00:00 │
│ 21    ┆ 2001-01-01 21:00:00 │
│ 22    ┆ 2001-01-01 22:00:00 │
│ 23    ┆ 2001-01-01 23:00:00 │
│ 24    ┆ 2001-01-02 00:00:00 │
└───────┴─────────────────────┘

Compute the rolling sum with the temporal windows closed on the right (default)

>>> df_temporal.with_columns(
...     rolling_row_sum=pl.col("index").rolling_sum_by("date", window_size="2h")
... )
shape: (25, 3)
┌───────┬─────────────────────┬─────────────────┐
│ index ┆ date                ┆ rolling_row_sum │
│ ---   ┆ ---                 ┆ ---             │
│ u32   ┆ datetime[μs]        ┆ u32             │
╞═══════╪═════════════════════╪═════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ 0               │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 1               │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 3               │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 5               │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 7               │
│ …     ┆ …                   ┆ …               │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 39              │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 41              │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 43              │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 45              │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 47              │
└───────┴─────────────────────┴─────────────────┘

Compute the rolling sum with the closure of windows on both sides

>>> df_temporal.with_columns(
...     rolling_row_sum=pl.col("index").rolling_sum_by(
...         "date", window_size="2h", closed="both"
...     )
... )
shape: (25, 3)
┌───────┬─────────────────────┬─────────────────┐
│ index ┆ date                ┆ rolling_row_sum │
│ ---   ┆ ---                 ┆ ---             │
│ u32   ┆ datetime[μs]        ┆ u32             │
╞═══════╪═════════════════════╪═════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ 0               │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 1               │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 3               │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 6               │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 9               │
│ …     ┆ …                   ┆ …               │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 57              │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 60              │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 63              │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 66              │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 69              │
└───────┴─────────────────────┴─────────────────┘
rolling_var(
window_size: int | timedelta,
weights: list[float] | None = None,
*,
min_periods: int | None = None,
center: bool = False,
ddof: int = 1,
) Self[source]

Compute a rolling variance.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

A window of length window_size will traverse the array. The values that fill this window will (optionally) be multiplied with the weights given by the weights vector. The resulting values will be aggregated to their var.

The window at a given row will include the row itself, and the window_size - 1 elements before it.

Parameters:
window_size

The length of the window in number of elements.

weights

An optional slice with the same length as the window that will be multiplied elementwise with the values in the window.

min_periods

The number of values in the window that should be non-null before computing a result. If set to None (default), it will be set equal to window_size.

center

Set the labels at the center of the window.

ddof

“Delta Degrees of Freedom”: The divisor for a length N window is N - ddof

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

>>> df = pl.DataFrame({"A": [1.0, 2.0, 3.0, 4.0, 5.0, 6.0]})
>>> df.with_columns(
...     rolling_var=pl.col("A").rolling_var(window_size=2),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_var │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 0.5         │
│ 3.0 ┆ 0.5         │
│ 4.0 ┆ 0.5         │
│ 5.0 ┆ 0.5         │
│ 6.0 ┆ 0.5         │
└─────┴─────────────┘

Specify weights to multiply the values in the window with:

>>> df.with_columns(
...     rolling_var=pl.col("A").rolling_var(
...         window_size=2, weights=[0.25, 0.75]
...     ),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_var │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 0.1875      │
│ 3.0 ┆ 0.1875      │
│ 4.0 ┆ 0.1875      │
│ 5.0 ┆ 0.1875      │
│ 6.0 ┆ 0.1875      │
└─────┴─────────────┘

Center the values in the window

>>> df.with_columns(
...     rolling_var=pl.col("A").rolling_var(window_size=3, center=True),
... )
shape: (6, 2)
┌─────┬─────────────┐
│ A   ┆ rolling_var │
│ --- ┆ ---         │
│ f64 ┆ f64         │
╞═════╪═════════════╡
│ 1.0 ┆ null        │
│ 2.0 ┆ 1.0         │
│ 3.0 ┆ 1.0         │
│ 4.0 ┆ 1.0         │
│ 5.0 ┆ 1.0         │
│ 6.0 ┆ null        │
└─────┴─────────────┘
rolling_var_by(
by: IntoExpr,
window_size: timedelta | str,
*,
min_periods: int = 1,
closed: ClosedInterval = 'right',
ddof: int = 1,
) Self[source]

Compute a rolling variance based on another column.

Warning

This functionality is considered unstable. It may be changed at any point without it being considered a breaking change.

Given a by column <t_0, t_1, ..., t_n>, then closed="right" (the default) means the windows will be:

  • (t_0 - window_size, t_0]

  • (t_1 - window_size, t_1]

  • (t_n - window_size, t_n]

Parameters:
by

This column must be of dtype Datetime or Date.

window_size

The length of the window. Can be a dynamic temporal size indicated by a timedelta or the following string language:

  • 1ns (1 nanosecond)

  • 1us (1 microsecond)

  • 1ms (1 millisecond)

  • 1s (1 second)

  • 1m (1 minute)

  • 1h (1 hour)

  • 1d (1 calendar day)

  • 1w (1 calendar week)

  • 1mo (1 calendar month)

  • 1q (1 calendar quarter)

  • 1y (1 calendar year)

By “calendar day”, we mean the corresponding time on the next day (which may not be 24 hours, due to daylight savings). Similarly for “calendar week”, “calendar month”, “calendar quarter”, and “calendar year”.

min_periods

The number of values in the window that should be non-null before computing a result.

closed{‘left’, ‘right’, ‘both’, ‘none’}

Define which sides of the temporal interval are closed (inclusive), defaults to 'right'.

ddof

“Delta Degrees of Freedom”: The divisor for a length N window is N - ddof

Notes

If you want to compute multiple aggregation statistics over the same dynamic window, consider using rolling - this method can cache the window size computation.

Examples

Create a DataFrame with a datetime column and a row number column

>>> from datetime import timedelta, datetime
>>> start = datetime(2001, 1, 1)
>>> stop = datetime(2001, 1, 2)
>>> df_temporal = pl.DataFrame(
...     {"date": pl.datetime_range(start, stop, "1h", eager=True)}
... ).with_row_index()
>>> df_temporal
shape: (25, 2)
┌───────┬─────────────────────┐
│ index ┆ date                │
│ ---   ┆ ---                 │
│ u32   ┆ datetime[μs]        │
╞═══════╪═════════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 │
│ 1     ┆ 2001-01-01 01:00:00 │
│ 2     ┆ 2001-01-01 02:00:00 │
│ 3     ┆ 2001-01-01 03:00:00 │
│ 4     ┆ 2001-01-01 04:00:00 │
│ …     ┆ …                   │
│ 20    ┆ 2001-01-01 20:00:00 │
│ 21    ┆ 2001-01-01 21:00:00 │
│ 22    ┆ 2001-01-01 22:00:00 │
│ 23    ┆ 2001-01-01 23:00:00 │
│ 24    ┆ 2001-01-02 00:00:00 │
└───────┴─────────────────────┘

Compute the rolling var with the temporal windows closed on the right (default)

>>> df_temporal.with_columns(
...     rolling_row_var=pl.col("index").rolling_var_by("date", window_size="2h")
... )
shape: (25, 3)
┌───────┬─────────────────────┬─────────────────┐
│ index ┆ date                ┆ rolling_row_var │
│ ---   ┆ ---                 ┆ ---             │
│ u32   ┆ datetime[μs]        ┆ f64             │
╞═══════╪═════════════════════╪═════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ null            │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 0.5             │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 0.5             │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 0.5             │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 0.5             │
│ …     ┆ …                   ┆ …               │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 0.5             │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 0.5             │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 0.5             │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 0.5             │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 0.5             │
└───────┴─────────────────────┴─────────────────┘

Compute the rolling var with the closure of windows on both sides

>>> df_temporal.with_columns(
...     rolling_row_var=pl.col("index").rolling_var_by(
...         "date", window_size="2h", closed="both"
...     )
... )
shape: (25, 3)
┌───────┬─────────────────────┬─────────────────┐
│ index ┆ date                ┆ rolling_row_var │
│ ---   ┆ ---                 ┆ ---             │
│ u32   ┆ datetime[μs]        ┆ f64             │
╞═══════╪═════════════════════╪═════════════════╡
│ 0     ┆ 2001-01-01 00:00:00 ┆ null            │
│ 1     ┆ 2001-01-01 01:00:00 ┆ 0.5             │
│ 2     ┆ 2001-01-01 02:00:00 ┆ 1.0             │
│ 3     ┆ 2001-01-01 03:00:00 ┆ 1.0             │
│ 4     ┆ 2001-01-01 04:00:00 ┆ 1.0             │
│ …     ┆ …                   ┆ …               │
│ 20    ┆ 2001-01-01 20:00:00 ┆ 1.0             │
│ 21    ┆ 2001-01-01 21:00:00 ┆ 1.0             │
│ 22    ┆ 2001-01-01 22:00:00 ┆ 1.0             │
│ 23    ┆ 2001-01-01 23:00:00 ┆ 1.0             │
│ 24    ┆ 2001-01-02 00:00:00 ┆ 1.0             │
└───────┴─────────────────────┴─────────────────┘
round(decimals: int = 0) Self[source]

Round underlying floating point data by decimals digits.

Parameters:
decimals

Number of decimals to round by.

Examples

>>> df = pl.DataFrame({"a": [0.33, 0.52, 1.02, 1.17]})
>>> df.select(pl.col("a").round(1))
shape: (4, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 0.3 │
│ 0.5 │
│ 1.0 │
│ 1.2 │
└─────┘
round_sig_figs(digits: int) Self[source]

Round to a number of significant figures.

Parameters:
digits

Number of significant figures to round to.

Examples

>>> df = pl.DataFrame({"a": [0.01234, 3.333, 1234.0]})
>>> df.with_columns(pl.col("a").round_sig_figs(2).alias("round_sig_figs"))
shape: (3, 2)
┌─────────┬────────────────┐
│ a       ┆ round_sig_figs │
│ ---     ┆ ---            │
│ f64     ┆ f64            │
╞═════════╪════════════════╡
│ 0.01234 ┆ 0.012          │
│ 3.333   ┆ 3.3            │
│ 1234.0  ┆ 1200.0         │
└─────────┴────────────────┘
sample(
n: int | IntoExprColumn | None = None,
*,
fraction: float | IntoExprColumn | None = None,
with_replacement: bool = False,
shuffle: bool = False,
seed: int | None = None,
) Self[source]

Sample from this expression.

Parameters:
n

Number of items to return. Cannot be used with fraction. Defaults to 1 if fraction is None.

fraction

Fraction of items to return. Cannot be used with n.

with_replacement

Allow values to be sampled more than once.

shuffle

Shuffle the order of sampled data points.

seed

Seed for the random number generator. If set to None (default), a random seed is generated for each sample operation.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3]})
>>> df.select(pl.col("a").sample(fraction=1.0, with_replacement=True, seed=1))
shape: (3, 1)
┌─────┐
│ a   │
│ --- │
│ i64 │
╞═════╡
│ 3   │
│ 1   │
│ 1   │
└─────┘
search_sorted(
element: IntoExpr | np.ndarray[Any, Any],
side: SearchSortedSide = 'any',
) Self[source]

Find indices where elements should be inserted to maintain order.

\[a[i-1] < v <= a[i]\]
Parameters:
element

Expression or scalar value.

side{‘any’, ‘left’, ‘right’}

If ‘any’, the index of the first suitable location found is given. If ‘left’, the index of the leftmost suitable location found is given. If ‘right’, return the rightmost suitable location found is given.

Examples

>>> df = pl.DataFrame(
...     {
...         "values": [1, 2, 3, 5],
...     }
... )
>>> df.select(
...     [
...         pl.col("values").search_sorted(0).alias("zero"),
...         pl.col("values").search_sorted(3).alias("three"),
...         pl.col("values").search_sorted(6).alias("six"),
...     ]
... )
shape: (1, 3)
┌──────┬───────┬─────┐
│ zero ┆ three ┆ six │
│ ---  ┆ ---   ┆ --- │
│ u32  ┆ u32   ┆ u32 │
╞══════╪═══════╪═════╡
│ 0    ┆ 2     ┆ 4   │
└──────┴───────┴─────┘
set_sorted(*, descending: bool = False) Self[source]

Flags the expression as ‘sorted’.

Enables downstream code to user fast paths for sorted arrays.

Parameters:
descending

Whether the Series order is descending.

Warning

This can lead to incorrect results if the data is NOT sorted!! Use with care!

Examples

>>> df = pl.DataFrame({"values": [1, 2, 3]})
>>> df.select(pl.col("values").set_sorted().max())
shape: (1, 1)
┌────────┐
│ values │
│ ---    │
│ i64    │
╞════════╡
│ 3      │
└────────┘
shift(n: int | IntoExprColumn = 1, *, fill_value: IntoExpr | None = None) Self[source]

Shift values by the given number of indices.

Parameters:
n

Number of indices to shift forward. If a negative value is passed, values are shifted in the opposite direction instead.

fill_value

Fill the resulting null values with this value.

Notes

This method is similar to the LAG operation in SQL when the value for n is positive. With a negative value for n, it is similar to LEAD.

Examples

By default, values are shifted forward by one index.

>>> df = pl.DataFrame({"a": [1, 2, 3, 4]})
>>> df.with_columns(shift=pl.col("a").shift())
shape: (4, 2)
┌─────┬───────┐
│ a   ┆ shift │
│ --- ┆ ---   │
│ i64 ┆ i64   │
╞═════╪═══════╡
│ 1   ┆ null  │
│ 2   ┆ 1     │
│ 3   ┆ 2     │
│ 4   ┆ 3     │
└─────┴───────┘

Pass a negative value to shift in the opposite direction instead.

>>> df.with_columns(shift=pl.col("a").shift(-2))
shape: (4, 2)
┌─────┬───────┐
│ a   ┆ shift │
│ --- ┆ ---   │
│ i64 ┆ i64   │
╞═════╪═══════╡
│ 1   ┆ 3     │
│ 2   ┆ 4     │
│ 3   ┆ null  │
│ 4   ┆ null  │
└─────┴───────┘

Specify fill_value to fill the resulting null values.

>>> df.with_columns(shift=pl.col("a").shift(-2, fill_value=100))
shape: (4, 2)
┌─────┬───────┐
│ a   ┆ shift │
│ --- ┆ ---   │
│ i64 ┆ i64   │
╞═════╪═══════╡
│ 1   ┆ 3     │
│ 2   ┆ 4     │
│ 3   ┆ 100   │
│ 4   ┆ 100   │
└─────┴───────┘
shrink_dtype() Self[source]

Shrink numeric columns to the minimal required datatype.

Shrink to the dtype needed to fit the extrema of this [Series]. This can be used to reduce memory pressure.

Examples

>>> pl.DataFrame(
...     {
...         "a": [1, 2, 3],
...         "b": [1, 2, 2 << 32],
...         "c": [-1, 2, 1 << 30],
...         "d": [-112, 2, 112],
...         "e": [-112, 2, 129],
...         "f": ["a", "b", "c"],
...         "g": [0.1, 1.32, 0.12],
...         "h": [True, None, False],
...     }
... ).select(pl.all().shrink_dtype())
shape: (3, 8)
┌─────┬────────────┬────────────┬──────┬──────┬─────┬──────┬───────┐
│ a   ┆ b          ┆ c          ┆ d    ┆ e    ┆ f   ┆ g    ┆ h     │
│ --- ┆ ---        ┆ ---        ┆ ---  ┆ ---  ┆ --- ┆ ---  ┆ ---   │
│ i8  ┆ i64        ┆ i32        ┆ i8   ┆ i16  ┆ str ┆ f32  ┆ bool  │
╞═════╪════════════╪════════════╪══════╪══════╪═════╪══════╪═══════╡
│ 1   ┆ 1          ┆ -1         ┆ -112 ┆ -112 ┆ a   ┆ 0.1  ┆ true  │
│ 2   ┆ 2          ┆ 2          ┆ 2    ┆ 2    ┆ b   ┆ 1.32 ┆ null  │
│ 3   ┆ 8589934592 ┆ 1073741824 ┆ 112  ┆ 129  ┆ c   ┆ 0.12 ┆ false │
└─────┴────────────┴────────────┴──────┴──────┴─────┴──────┴───────┘
shuffle(seed: int | None = None) Self[source]

Shuffle the contents of this expression.

Parameters:
seed

Seed for the random number generator. If set to None (default), a random seed is generated each time the shuffle is called.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3]})
>>> df.select(pl.col("a").shuffle(seed=1))
shape: (3, 1)
┌─────┐
│ a   │
│ --- │
│ i64 │
╞═════╡
│ 2   │
│ 1   │
│ 3   │
└─────┘
sign() Self[source]

Compute the element-wise indication of the sign.

The returned values can be -1, 0, or 1:

  • -1 if x < 0.

  • 0 if x == 0.

  • 1 if x > 0.

(null values are preserved as-is).

Examples

>>> df = pl.DataFrame({"a": [-9.0, -0.0, 0.0, 4.0, None]})
>>> df.select(pl.col("a").sign())
shape: (5, 1)
┌──────┐
│ a    │
│ ---  │
│ i64  │
╞══════╡
│ -1   │
│ 0    │
│ 0    │
│ 1    │
│ null │
└──────┘
sin() Self[source]

Compute the element-wise value for the sine.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [0.0]})
>>> df.select(pl.col("a").sin())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 0.0 │
└─────┘
sinh() Self[source]

Compute the element-wise value for the hyperbolic sine.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [1.0]})
>>> df.select(pl.col("a").sinh())
shape: (1, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 1.175201 │
└──────────┘
skew(*, bias: bool = True) Self[source]

Compute the sample skewness of a data set.

For normally distributed data, the skewness should be about zero. For unimodal continuous distributions, a skewness value greater than zero means that there is more weight in the right tail of the distribution. The function skewtest can be used to determine if the skewness value is close enough to zero, statistically speaking.

See scipy.stats for more information.

Parameters:
biasbool, optional

If False, the calculations are corrected for statistical bias.

Notes

The sample skewness is computed as the Fisher-Pearson coefficient of skewness, i.e.

\[g_1=\frac{m_3}{m_2^{3/2}}\]

where

\[m_i=\frac{1}{N}\sum_{n=1}^N(x[n]-\bar{x})^i\]

is the biased sample \(i\texttt{th}\) central moment, and \(\bar{x}\) is the sample mean. If bias is False, the calculations are corrected for bias and the value computed is the adjusted Fisher-Pearson standardized moment coefficient, i.e.

\[G_1 = \frac{k_3}{k_2^{3/2}} = \frac{\sqrt{N(N-1)}}{N-2}\frac{m_3}{m_2^{3/2}}\]

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3, 2, 1]})
>>> df.select(pl.col("a").skew())
shape: (1, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 0.343622 │
└──────────┘
slice(offset: int | Expr, length: int | Expr | None = None) Self[source]

Get a slice of this expression.

Parameters:
offset

Start index. Negative indexing is supported.

length

Length of the slice. If set to None, all rows starting at the offset will be selected.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [8, 9, 10, 11],
...         "b": [None, 4, 4, 4],
...     }
... )
>>> df.select(pl.all().slice(1, 2))
shape: (2, 2)
┌─────┬─────┐
│ a   ┆ b   │
│ --- ┆ --- │
│ i64 ┆ i64 │
╞═════╪═════╡
│ 9   ┆ 4   │
│ 10  ┆ 4   │
└─────┴─────┘
sort(*, descending: bool = False, nulls_last: bool = False) Self[source]

Sort this column.

When used in a projection/selection context, the whole column is sorted. When used in a group by context, the groups are sorted.

Parameters:
descending

Sort in descending order.

nulls_last

Place null values last.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, None, 3, 2],
...     }
... )
>>> df.select(pl.col("a").sort())
shape: (4, 1)
┌──────┐
│ a    │
│ ---  │
│ i64  │
╞══════╡
│ null │
│ 1    │
│ 2    │
│ 3    │
└──────┘
>>> df.select(pl.col("a").sort(descending=True))
shape: (4, 1)
┌──────┐
│ a    │
│ ---  │
│ i64  │
╞══════╡
│ null │
│ 3    │
│ 2    │
│ 1    │
└──────┘
>>> df.select(pl.col("a").sort(nulls_last=True))
shape: (4, 1)
┌──────┐
│ a    │
│ ---  │
│ i64  │
╞══════╡
│ 1    │
│ 2    │
│ 3    │
│ null │
└──────┘

When sorting in a group by context, the groups are sorted.

>>> df = pl.DataFrame(
...     {
...         "group": ["one", "one", "one", "two", "two", "two"],
...         "value": [1, 98, 2, 3, 99, 4],
...     }
... )
>>> df.group_by("group").agg(pl.col("value").sort())  
shape: (2, 2)
┌───────┬────────────┐
│ group ┆ value      │
│ ---   ┆ ---        │
│ str   ┆ list[i64]  │
╞═══════╪════════════╡
│ two   ┆ [3, 4, 99] │
│ one   ┆ [1, 2, 98] │
└───────┴────────────┘
sort_by(
by: IntoExpr | Iterable[IntoExpr],
*more_by: IntoExpr,
descending: bool | Sequence[bool] = False,
nulls_last: bool | Sequence[bool] = False,
multithreaded: bool = True,
maintain_order: bool = False,
) Self[source]

Sort this column by the ordering of other columns.

When used in a projection/selection context, the whole column is sorted. When used in a group by context, the groups are sorted.

Parameters:
by

Column(s) to sort by. Accepts expression input. Strings are parsed as column names.

*more_by

Additional columns to sort by, specified as positional arguments.

descending

Sort in descending order. When sorting by multiple columns, can be specified per column by passing a sequence of booleans.

nulls_last

Place null values last; can specify a single boolean applying to all columns or a sequence of booleans for per-column control.

multithreaded

Sort using multiple threads.

maintain_order

Whether the order should be maintained if elements are equal.

Examples

Pass a single column name to sort by that column.

>>> df = pl.DataFrame(
...     {
...         "group": ["a", "a", "b", "b"],
...         "value1": [1, 3, 4, 2],
...         "value2": [8, 7, 6, 5],
...     }
... )
>>> df.select(pl.col("group").sort_by("value1"))
shape: (4, 1)
┌───────┐
│ group │
│ ---   │
│ str   │
╞═══════╡
│ a     │
│ b     │
│ a     │
│ b     │
└───────┘

Sorting by expressions is also supported.

>>> df.select(pl.col("group").sort_by(pl.col("value1") + pl.col("value2")))
shape: (4, 1)
┌───────┐
│ group │
│ ---   │
│ str   │
╞═══════╡
│ b     │
│ a     │
│ a     │
│ b     │
└───────┘

Sort by multiple columns by passing a list of columns.

>>> df.select(pl.col("group").sort_by(["value1", "value2"], descending=True))
shape: (4, 1)
┌───────┐
│ group │
│ ---   │
│ str   │
╞═══════╡
│ b     │
│ a     │
│ b     │
│ a     │
└───────┘

Or use positional arguments to sort by multiple columns in the same way.

>>> df.select(pl.col("group").sort_by("value1", "value2"))
shape: (4, 1)
┌───────┐
│ group │
│ ---   │
│ str   │
╞═══════╡
│ a     │
│ b     │
│ a     │
│ b     │
└───────┘

When sorting in a group by context, the groups are sorted.

>>> df.group_by("group").agg(
...     pl.col("value1").sort_by("value2")
... )  
shape: (2, 2)
┌───────┬───────────┐
│ group ┆ value1    │
│ ---   ┆ ---       │
│ str   ┆ list[i64] │
╞═══════╪═══════════╡
│ a     ┆ [3, 1]    │
│ b     ┆ [2, 4]    │
└───────┴───────────┘

Take a single row from each group where a column attains its minimal value within that group.

>>> df.group_by("group").agg(
...     pl.all().sort_by("value2").first()
... )  
shape: (2, 3)
┌───────┬────────┬────────┐
│ group ┆ value1 ┆ value2 |
│ ---   ┆ ---    ┆ ---    │
│ str   ┆ i64    ┆ i64    |
╞═══════╪════════╪════════╡
│ a     ┆ 3      ┆ 7      |
│ b     ┆ 2      ┆ 5      |
└───────┴────────┴────────┘
sqrt() Self[source]

Compute the square root of the elements.

Examples

>>> df = pl.DataFrame({"values": [1.0, 2.0, 4.0]})
>>> df.select(pl.col("values").sqrt())
shape: (3, 1)
┌──────────┐
│ values   │
│ ---      │
│ f64      │
╞══════════╡
│ 1.0      │
│ 1.414214 │
│ 2.0      │
└──────────┘
std(ddof: int = 1) Self[source]

Get standard deviation.

Parameters:
ddof

“Delta Degrees of Freedom”: the divisor used in the calculation is N - ddof, where N represents the number of elements. By default ddof is 1.

Examples

>>> df = pl.DataFrame({"a": [-1, 0, 1]})
>>> df.select(pl.col("a").std())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 1.0 │
└─────┘
sub(other: Any) Self[source]

Method equivalent of subtraction operator expr - other.

Parameters:
other

Numeric literal or expression value.

Examples

>>> df = pl.DataFrame({"x": [0, 1, 2, 3, 4]})
>>> df.with_columns(
...     pl.col("x").sub(2).alias("x-2"),
...     pl.col("x").sub(pl.col("x").cum_sum()).alias("x-expr"),
... )
shape: (5, 3)
┌─────┬─────┬────────┐
│ x   ┆ x-2 ┆ x-expr │
│ --- ┆ --- ┆ ---    │
│ i64 ┆ i64 ┆ i64    │
╞═════╪═════╪════════╡
│ 0   ┆ -2  ┆ 0      │
│ 1   ┆ -1  ┆ 0      │
│ 2   ┆ 0   ┆ -1     │
│ 3   ┆ 1   ┆ -3     │
│ 4   ┆ 2   ┆ -6     │
└─────┴─────┴────────┘
sum() Self[source]

Get sum value.

Notes

Dtypes in {Int8, UInt8, Int16, UInt16} are cast to Int64 before summing to prevent overflow issues.

Examples

>>> df = pl.DataFrame({"a": [-1, 0, 1]})
>>> df.select(pl.col("a").sum())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ i64 │
╞═════╡
│  0  │
└─────┘
tail(n: int | Expr = 10) Self[source]

Get the last n rows.

Parameters:
n

Number of rows to return.

Examples

>>> df = pl.DataFrame({"foo": [1, 2, 3, 4, 5, 6, 7]})
>>> df.tail(3)
shape: (3, 1)
┌─────┐
│ foo │
│ --- │
│ i64 │
╞═════╡
│ 5   │
│ 6   │
│ 7   │
└─────┘
tan() Self[source]

Compute the element-wise value for the tangent.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [1.0]})
>>> df.select(pl.col("a").tan().round(2))
shape: (1, 1)
┌──────┐
│ a    │
│ ---  │
│ f64  │
╞══════╡
│ 1.56 │
└──────┘
tanh() Self[source]

Compute the element-wise value for the hyperbolic tangent.

Returns:
Expr

Expression of data type Float64.

Examples

>>> df = pl.DataFrame({"a": [1.0]})
>>> df.select(pl.col("a").tanh())
shape: (1, 1)
┌──────────┐
│ a        │
│ ---      │
│ f64      │
╞══════════╡
│ 0.761594 │
└──────────┘
to_physical() Self[source]

Cast to physical representation of the logical dtype.

Other data types will be left unchanged.

Examples

Replicating the pandas pd.factorize function.

>>> pl.DataFrame({"vals": ["a", "x", None, "a"]}).with_columns(
...     pl.col("vals").cast(pl.Categorical),
...     pl.col("vals")
...     .cast(pl.Categorical)
...     .to_physical()
...     .alias("vals_physical"),
... )
shape: (4, 2)
┌──────┬───────────────┐
│ vals ┆ vals_physical │
│ ---  ┆ ---           │
│ cat  ┆ u32           │
╞══════╪═══════════════╡
│ a    ┆ 0             │
│ x    ┆ 1             │
│ null ┆ null          │
│ a    ┆ 0             │
└──────┴───────────────┘
top_k(k: int | IntoExprColumn = 5) Self[source]

Return the k largest elements.

Non-null elements are always preferred over null elements. The output is not guaranteed to be in any particular order, call sort() after this function if you wish the output to be sorted.

This has time complexity:

\[O(n)\]
Parameters:
k

Number of elements to return.

Examples

Get the 5 largest values in series.

>>> df = pl.DataFrame({"value": [1, 98, 2, 3, 99, 4]})
>>> df.select(
...     pl.col("value").top_k().alias("top_k"),
...     pl.col("value").bottom_k().alias("bottom_k"),
... )
shape: (5, 2)
┌───────┬──────────┐
│ top_k ┆ bottom_k │
│ ---   ┆ ---      │
│ i64   ┆ i64      │
╞═══════╪══════════╡
│ 4     ┆ 1        │
│ 98    ┆ 98       │
│ 2     ┆ 2        │
│ 3     ┆ 3        │
│ 99    ┆ 4        │
└───────┴──────────┘
top_k_by(
by: IntoExpr | Iterable[IntoExpr],
k: int | IntoExprColumn = 5,
*,
reverse: bool | Sequence[bool] = False,
) Self[source]

Return the elements corresponding to the k largest elements of the by column(s).

Non-null elements are always preferred over null elements, regardless of the value of reverse. The output is not guaranteed to be in any particular order, call sort() after this function if you wish the output to be sorted.

This has time complexity:

\[O(n \log{n})\]
Parameters:
by

Column(s) used to determine the largest elements. Accepts expression input. Strings are parsed as column names.

k

Number of elements to return.

reverse

Consider the k smallest elements of the by column(s) (instead of the k largest). This can be specified per column by passing a sequence of booleans.

Examples

>>> df = pl.DataFrame(
...     {
...         "a": [1, 2, 3, 4, 5, 6],
...         "b": [6, 5, 4, 3, 2, 1],
...         "c": ["Apple", "Orange", "Apple", "Apple", "Banana", "Banana"],
...     }
... )
>>> df
shape: (6, 3)
┌─────┬─────┬────────┐
│ a   ┆ b   ┆ c      │
│ --- ┆ --- ┆ ---    │
│ i64 ┆ i64 ┆ str    │
╞═════╪═════╪════════╡
│ 1   ┆ 6   ┆ Apple  │
│ 2   ┆ 5   ┆ Orange │
│ 3   ┆ 4   ┆ Apple  │
│ 4   ┆ 3   ┆ Apple  │
│ 5   ┆ 2   ┆ Banana │
│ 6   ┆ 1   ┆ Banana │
└─────┴─────┴────────┘

Get the top 2 rows by column a or b.

>>> df.select(
...     pl.all().top_k_by("a", 2).name.suffix("_top_by_a"),
...     pl.all().top_k_by("b", 2).name.suffix("_top_by_b"),
... )
shape: (2, 6)
┌────────────┬────────────┬────────────┬────────────┬────────────┬────────────┐
│ a_top_by_a ┆ b_top_by_a ┆ c_top_by_a ┆ a_top_by_b ┆ b_top_by_b ┆ c_top_by_b │
│ ---        ┆ ---        ┆ ---        ┆ ---        ┆ ---        ┆ ---        │
│ i64        ┆ i64        ┆ str        ┆ i64        ┆ i64        ┆ str        │
╞════════════╪════════════╪════════════╪════════════╪════════════╪════════════╡
│ 6          ┆ 1          ┆ Banana     ┆ 1          ┆ 6          ┆ Apple      │
│ 5          ┆ 2          ┆ Banana     ┆ 2          ┆ 5          ┆ Orange     │
└────────────┴────────────┴────────────┴────────────┴────────────┴────────────┘

Get the top 2 rows by multiple columns with given order.

>>> df.select(
...     pl.all()
...     .top_k_by(["c", "a"], 2, reverse=[False, True])
...     .name.suffix("_by_ca"),
...     pl.all()
...     .top_k_by(["c", "b"], 2, reverse=[False, True])
...     .name.suffix("_by_cb"),
... )
shape: (2, 6)
┌─────────┬─────────┬─────────┬─────────┬─────────┬─────────┐
│ a_by_ca ┆ b_by_ca ┆ c_by_ca ┆ a_by_cb ┆ b_by_cb ┆ c_by_cb │
│ ---     ┆ ---     ┆ ---     ┆ ---     ┆ ---     ┆ ---     │
│ i64     ┆ i64     ┆ str     ┆ i64     ┆ i64     ┆ str     │
╞═════════╪═════════╪═════════╪═════════╪═════════╪═════════╡
│ 2       ┆ 5       ┆ Orange  ┆ 2       ┆ 5       ┆ Orange  │
│ 5       ┆ 2       ┆ Banana  ┆ 6       ┆ 1       ┆ Banana  │
└─────────┴─────────┴─────────┴─────────┴─────────┴─────────┘

Get the top 2 rows by column a in each group.

>>> (
...     df.group_by("c", maintain_order=True)
...     .agg(pl.all().top_k_by("a", 2))
...     .explode(pl.all().exclude("c"))
... )
shape: (5, 3)
┌────────┬─────┬─────┐
│ c      ┆ a   ┆ b   │
│ ---    ┆ --- ┆ --- │
│ str    ┆ i64 ┆ i64 │
╞════════╪═════╪═════╡
│ Apple  ┆ 4   ┆ 3   │
│ Apple  ┆ 3   ┆ 4   │
│ Orange ┆ 2   ┆ 5   │
│ Banana ┆ 6   ┆ 1   │
│ Banana ┆ 5   ┆ 2   │
└────────┴─────┴─────┘
truediv(other: Any) Self[source]

Method equivalent of float division operator expr / other.

Parameters:
other

Numeric literal or expression value.

See also

floordiv

Notes

Zero-division behaviour follows IEEE-754:

0/0: Invalid operation - mathematically undefined, returns NaN. n/0: On finite operands gives an exact infinite result, eg: ±infinity.

Examples

>>> df = pl.DataFrame(
...     data={"x": [-2, -1, 0, 1, 2], "y": [0.5, 0.0, 0.0, -4.0, -0.5]}
... )
>>> df.with_columns(
...     pl.col("x").truediv(2).alias("x/2"),
...     pl.col("x").truediv(pl.col("y")).alias("x/y"),
... )
shape: (5, 4)
┌─────┬──────┬──────┬───────┐
│ x   ┆ y    ┆ x/2  ┆ x/y   │
│ --- ┆ ---  ┆ ---  ┆ ---   │
│ i64 ┆ f64  ┆ f64  ┆ f64   │
╞═════╪══════╪══════╪═══════╡
│ -2  ┆ 0.5  ┆ -1.0 ┆ -4.0  │
│ -1  ┆ 0.0  ┆ -0.5 ┆ -inf  │
│ 0   ┆ 0.0  ┆ 0.0  ┆ NaN   │
│ 1   ┆ -4.0 ┆ 0.5  ┆ -0.25 │
│ 2   ┆ -0.5 ┆ 1.0  ┆ -4.0  │
└─────┴──────┴──────┴───────┘
unique(*, maintain_order: bool = False) Self[source]

Get unique values of this expression.

Parameters:
maintain_order

Maintain order of data. This requires more work.

Examples

>>> df = pl.DataFrame({"a": [1, 1, 2]})
>>> df.select(pl.col("a").unique())  
shape: (2, 1)
┌─────┐
│ a   │
│ --- │
│ i64 │
╞═════╡
│ 2   │
│ 1   │
└─────┘
>>> df.select(pl.col("a").unique(maintain_order=True))
shape: (2, 1)
┌─────┐
│ a   │
│ --- │
│ i64 │
╞═════╡
│ 1   │
│ 2   │
└─────┘
unique_counts() Self[source]

Return a count of the unique values in the order of appearance.

This method differs from value_counts in that it does not return the values, only the counts and might be faster

Examples

>>> df = pl.DataFrame(
...     {
...         "id": ["a", "b", "b", "c", "c", "c"],
...     }
... )
>>> df.select(
...     [
...         pl.col("id").unique_counts(),
...     ]
... )
shape: (3, 1)
┌─────┐
│ id  │
│ --- │
│ u32 │
╞═════╡
│ 1   │
│ 2   │
│ 3   │
└─────┘
upper_bound() Self[source]

Calculate the upper bound.

Returns a unit Series with the highest value possible for the dtype of this expression.

Examples

>>> df = pl.DataFrame({"a": [1, 2, 3, 2, 1]})
>>> df.select(pl.col("a").upper_bound())
shape: (1, 1)
┌─────────────────────┐
│ a                   │
│ ---                 │
│ i64                 │
╞═════════════════════╡
│ 9223372036854775807 │
└─────────────────────┘
value_counts(
*,
sort: bool = False,
parallel: bool = False,
name: str = 'count',
) Self[source]

Count the occurrences of unique values.

Parameters:
sort

Sort the output by count in descending order. If set to False (default), the order of the output is random.

parallel

Execute the computation in parallel.

Note

This option should likely not be enabled in a group by context, as the computation is already parallelized per group.

name

Give the resulting count field a specific name; defaults to “count”.

Returns:
Expr

Expression of data type Struct with mapping of unique values to their count.

Examples

>>> df = pl.DataFrame(
...     {"color": ["red", "blue", "red", "green", "blue", "blue"]}
... )
>>> df.select(pl.col("color").value_counts())  
shape: (3, 1)
┌─────────────┐
│ color       │
│ ---         │
│ struct[2]   │
╞═════════════╡
│ {"red",2}   │
│ {"green",1} │
│ {"blue",3}  │
└─────────────┘

Sort the output by (descending) count and customize the count field name.

>>> df = df.select(pl.col("color").value_counts(sort=True, name="n"))
>>> df
shape: (3, 1)
┌─────────────┐
│ color       │
│ ---         │
│ struct[2]   │
╞═════════════╡
│ {"blue",3}  │
│ {"red",2}   │
│ {"green",1} │
└─────────────┘
>>> df.unnest("color")
shape: (3, 2)
┌───────┬─────┐
│ color ┆ n   │
│ ---   ┆ --- │
│ str   ┆ u32 │
╞═══════╪═════╡
│ blue  ┆ 3   │
│ red   ┆ 2   │
│ green ┆ 1   │
└───────┴─────┘
var(ddof: int = 1) Self[source]

Get variance.

Parameters:
ddof

“Delta Degrees of Freedom”: the divisor used in the calculation is N - ddof, where N represents the number of elements. By default ddof is 1.

Examples

>>> df = pl.DataFrame({"a": [-1, 0, 1]})
>>> df.select(pl.col("a").var())
shape: (1, 1)
┌─────┐
│ a   │
│ --- │
│ f64 │
╞═════╡
│ 1.0 │
└─────┘
where(predicate: Expr) Self[source]

Filter a single column.

Deprecated since version 0.20.4: Use filter() instead.

Alias for filter().

Parameters:
predicate

Boolean expression.

Examples

>>> df = pl.DataFrame(
...     {
...         "group_col": ["g1", "g1", "g2"],
...         "b": [1, 2, 3],
...     }
... )
>>> df.group_by("group_col").agg(  
...     [
...         pl.col("b").where(pl.col("b") < 2).sum().alias("lt"),
...         pl.col("b").where(pl.col("b") >= 2).sum().alias("gte"),
...     ]
... ).sort("group_col")
shape: (2, 3)
┌───────────┬─────┬─────┐
│ group_col ┆ lt  ┆ gte │
│ ---       ┆ --- ┆ --- │
│ str       ┆ i64 ┆ i64 │
╞═══════════╪═════╪═════╡
│ g1        ┆ 1   ┆ 2   │
│ g2        ┆ 0   ┆ 3   │
└───────────┴─────┴─────┘
xor(other: Any) Self[source]

Method equivalent of bitwise exclusive-or operator expr ^ other.

Parameters:
other

Integer or boolean value; accepts expression input.

Examples

>>> df = pl.DataFrame(
...     {"x": [True, False, True, False], "y": [True, True, False, False]}
... )
>>> df.with_columns(pl.col("x").xor(pl.col("y")).alias("x ^ y"))
shape: (4, 3)
┌───────┬───────┬───────┐
│ x     ┆ y     ┆ x ^ y │
│ ---   ┆ ---   ┆ ---   │
│ bool  ┆ bool  ┆ bool  │
╞═══════╪═══════╪═══════╡
│ true  ┆ true  ┆ false │
│ false ┆ true  ┆ true  │
│ true  ┆ false ┆ true  │
│ false ┆ false ┆ false │
└───────┴───────┴───────┘
>>> def binary_string(n: int) -> str:
...     return bin(n)[2:].zfill(8)
>>>
>>> df = pl.DataFrame(
...     data={"x": [10, 8, 250, 66], "y": [1, 2, 3, 4]},
...     schema={"x": pl.UInt8, "y": pl.UInt8},
... )
>>> df.with_columns(
...     pl.col("x")
...     .map_elements(binary_string, return_dtype=pl.String)
...     .alias("bin_x"),
...     pl.col("y")
...     .map_elements(binary_string, return_dtype=pl.String)
...     .alias("bin_y"),
...     pl.col("x").xor(pl.col("y")).alias("xor_xy"),
...     pl.col("x")
...     .xor(pl.col("y"))
...     .map_elements(binary_string, return_dtype=pl.String)
...     .alias("bin_xor_xy"),
... )
shape: (4, 6)
┌─────┬─────┬──────────┬──────────┬────────┬────────────┐
│ x   ┆ y   ┆ bin_x    ┆ bin_y    ┆ xor_xy ┆ bin_xor_xy │
│ --- ┆ --- ┆ ---      ┆ ---      ┆ ---    ┆ ---        │
│ u8  ┆ u8  ┆ str      ┆ str      ┆ u8     ┆ str        │
╞═════╪═════╪══════════╪══════════╪════════╪════════════╡
│ 10  ┆ 1   ┆ 00001010 ┆ 00000001 ┆ 11     ┆ 00001011   │
│ 8   ┆ 2   ┆ 00001000 ┆ 00000010 ┆ 10     ┆ 00001010   │
│ 250 ┆ 3   ┆ 11111010 ┆ 00000011 ┆ 249    ┆ 11111001   │
│ 66  ┆ 4   ┆ 01000010 ┆ 00000100 ┆ 70     ┆ 01000110   │
└─────┴─────┴──────────┴──────────┴────────┴────────────┘