Sam Chaudry

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	"""Metrics to assess performance on regression task.

	Functions named as ``*_score`` return a scalar value to maximize: the higher
	the better.

	Function named as ``_error`` or ``_loss`` return a scalar value to minimize:
	the lower the better.
	"""

	# Authors: The scikit-learn developers
	# SPDX-License-Identifier: BSD-3-Clause

	import warnings
	from numbers import Real

	import numpy as np
	from scipy.special import xlogy

	from ..exceptions import UndefinedMetricWarning
	from ..utils._array_api import (
	_average,
	_find_matching_floating_dtype,
	get_namespace,
	get_namespace_and_device,
	size,
	)
	from ..utils._param_validation import Interval, StrOptions, validate_params
	from ..utils.stats import _weighted_percentile
	from ..utils.validation import (
	_check_sample_weight,
	_num_samples,
	check_array,
	check_consistent_length,
	column_or_1d,
	)

	__ALL__ = [
	"max_error",
	"mean_absolute_error",
	"mean_squared_error",
	"mean_squared_log_error",
	"median_absolute_error",
	"mean_absolute_percentage_error",
	"mean_pinball_loss",
	"r2_score",
	"root_mean_squared_log_error",
	"root_mean_squared_error",
	"explained_variance_score",
	"mean_tweedie_deviance",
	"mean_poisson_deviance",
	"mean_gamma_deviance",
	"d2_tweedie_score",
	"d2_pinball_score",
	"d2_absolute_error_score",
	]


	def _check_reg_targets(y_true, y_pred, multioutput, dtype="numeric", xp=None):
	"""Check that y_true and y_pred belong to the same regression task.

	To reduce redundancy when calling `_find_matching_floating_dtype`,
	please use `_check_reg_targets_with_floating_dtype` instead.

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	multioutput : array-like or string in ['raw_values', uniform_average',
	'variance_weighted'] or None
	None is accepted due to backward compatibility of r2_score().

	dtype : str or list, default="numeric"
	the dtype argument passed to check_array.

	xp : module, default=None
	Precomputed array namespace module. When passed, typically from a caller
	that has already performed inspection of its own inputs, skips array
	namespace inspection.

	Returns
	-------
	type_true : one of {'continuous', continuous-multioutput'}
	The type of the true target data, as output by
	'utils.multiclass.type_of_target'.

	y_true : array-like of shape (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples, n_outputs)
	Estimated target values.

	multioutput : array-like of shape (n_outputs) or string in ['raw_values',
	uniform_average', 'variance_weighted'] or None
	Custom output weights if ``multioutput`` is array-like or
	just the corresponding argument if ``multioutput`` is a
	correct keyword.
	"""
	xp, _ = get_namespace(y_true, y_pred, multioutput, xp=xp)

	check_consistent_length(y_true, y_pred)
	y_true = check_array(y_true, ensure_2d=False, dtype=dtype)
	y_pred = check_array(y_pred, ensure_2d=False, dtype=dtype)

	if y_true.ndim == 1:
	y_true = xp.reshape(y_true, (-1, 1))

	if y_pred.ndim == 1:
	y_pred = xp.reshape(y_pred, (-1, 1))

	if y_true.shape[1] != y_pred.shape[1]:
	raise ValueError(
	"y_true and y_pred have different number of output ({0}!={1})".format(
	y_true.shape[1], y_pred.shape[1]
	)
	)

	n_outputs = y_true.shape[1]
	allowed_multioutput_str = ("raw_values", "uniform_average", "variance_weighted")
	if isinstance(multioutput, str):
	if multioutput not in allowed_multioutput_str:
	raise ValueError(
	"Allowed 'multioutput' string values are {}. "
	"You provided multioutput={!r}".format(
	allowed_multioutput_str, multioutput
	)
	)
	elif multioutput is not None:
	multioutput = check_array(multioutput, ensure_2d=False)
	if n_outputs == 1:
	raise ValueError("Custom weights are useful only in multi-output cases.")
	elif n_outputs != multioutput.shape[0]:
	raise ValueError(
	"There must be equally many custom weights "
	f"({multioutput.shape[0]}) as outputs ({n_outputs})."
	)
	y_type = "continuous" if n_outputs == 1 else "continuous-multioutput"

	return y_type, y_true, y_pred, multioutput


	def _check_reg_targets_with_floating_dtype(
	y_true, y_pred, sample_weight, multioutput, xp=None
	):
	"""Ensures that y_true, y_pred, and sample_weight correspond to the same
	regression task.

	Extends `_check_reg_targets` by automatically selecting a suitable floating-point
	data type for inputs using `_find_matching_floating_dtype`.

	Use this private method only when converting inputs to array API-compatibles.

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,)

	multioutput : array-like or string in ['raw_values', 'uniform_average', \
	'variance_weighted'] or None
	None is accepted due to backward compatibility of r2_score().

	xp : module, default=None
	Precomputed array namespace module. When passed, typically from a caller
	that has already performed inspection of its own inputs, skips array
	namespace inspection.

	Returns
	-------
	type_true : one of {'continuous', 'continuous-multioutput'}
	The type of the true target data, as output by
	'utils.multiclass.type_of_target'.

	y_true : array-like of shape (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	multioutput : array-like of shape (n_outputs) or string in ['raw_values', \
	'uniform_average', 'variance_weighted'] or None
	Custom output weights if ``multioutput`` is array-like or
	just the corresponding argument if ``multioutput`` is a
	correct keyword.
	"""
	dtype_name = _find_matching_floating_dtype(y_true, y_pred, sample_weight, xp=xp)

	y_type, y_true, y_pred, multioutput = _check_reg_targets(
	y_true, y_pred, multioutput, dtype=dtype_name, xp=xp
	)

	# _check_reg_targets does not accept sample_weight as input.
	# Convert sample_weight's data type separately to match dtype_name.
	if sample_weight is not None:
	sample_weight = xp.asarray(sample_weight, dtype=dtype_name)

	return y_type, y_true, y_pred, sample_weight, multioutput


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"multioutput": [StrOptions({"raw_values", "uniform_average"}), "array-like"],
	},
	prefer_skip_nested_validation=True,
	)
	def mean_absolute_error(
	y_true, y_pred, *, sample_weight=None, multioutput="uniform_average"
	):
	"""Mean absolute error regression loss.

	Read more in the :ref:`User Guide <mean_absolute_error>`.

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	multioutput : {'raw_values', 'uniform_average'} or array-like of shape \
	(n_outputs,), default='uniform_average'
	Defines aggregating of multiple output values.
	Array-like value defines weights used to average errors.

	'raw_values' :
	Returns a full set of errors in case of multioutput input.

	'uniform_average' :
	Errors of all outputs are averaged with uniform weight.

	Returns
	-------
	loss : float or array of floats
	If multioutput is 'raw_values', then mean absolute error is returned
	for each output separately.
	If multioutput is 'uniform_average' or an ndarray of weights, then the
	weighted average of all output errors is returned.

	MAE output is non-negative floating point. The best value is 0.0.

	Examples
	--------
	>>> from sklearn.metrics import mean_absolute_error
	>>> y_true = [3, -0.5, 2, 7]
	>>> y_pred = [2.5, 0.0, 2, 8]
	>>> mean_absolute_error(y_true, y_pred)
	0.5
	>>> y_true = [[0.5, 1], [-1, 1], [7, -6]]
	>>> y_pred = [[0, 2], [-1, 2], [8, -5]]
	>>> mean_absolute_error(y_true, y_pred)
	0.75
	>>> mean_absolute_error(y_true, y_pred, multioutput='raw_values')
	array([0.5, 1. ])
	>>> mean_absolute_error(y_true, y_pred, multioutput=[0.3, 0.7])
	0.85...
	"""
	xp, _ = get_namespace(y_true, y_pred, sample_weight, multioutput)

	_, y_true, y_pred, sample_weight, multioutput = (
	_check_reg_targets_with_floating_dtype(
	y_true, y_pred, sample_weight, multioutput, xp=xp
	)
	)

	check_consistent_length(y_true, y_pred, sample_weight)

	output_errors = _average(
	xp.abs(y_pred - y_true), weights=sample_weight, axis=0, xp=xp
	)
	if isinstance(multioutput, str):
	if multioutput == "raw_values":
	return output_errors
	elif multioutput == "uniform_average":
	# pass None as weights to np.average: uniform mean
	multioutput = None

	# Average across the outputs (if needed).
	# The second call to `_average` should always return
	# a scalar array that we convert to a Python float to
	# consistently return the same eager evaluated value.
	# Therefore, `axis=None`.
	mean_absolute_error = _average(output_errors, weights=multioutput)

	return float(mean_absolute_error)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"alpha": [Interval(Real, 0, 1, closed="both")],
	"multioutput": [StrOptions({"raw_values", "uniform_average"}), "array-like"],
	},
	prefer_skip_nested_validation=True,
	)
	def mean_pinball_loss(
	y_true, y_pred, *, sample_weight=None, alpha=0.5, multioutput="uniform_average"
	):
	"""Pinball loss for quantile regression.

	Read more in the :ref:`User Guide <pinball_loss>`.

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	alpha : float, slope of the pinball loss, default=0.5,
	This loss is equivalent to :ref:`mean_absolute_error` when `alpha=0.5`,
	`alpha=0.95` is minimized by estimators of the 95th percentile.

	multioutput : {'raw_values', 'uniform_average'} or array-like of shape \
	(n_outputs,), default='uniform_average'
	Defines aggregating of multiple output values.
	Array-like value defines weights used to average errors.

	'raw_values' :
	Returns a full set of errors in case of multioutput input.

	'uniform_average' :
	Errors of all outputs are averaged with uniform weight.

	Returns
	-------
	loss : float or ndarray of floats
	If multioutput is 'raw_values', then mean absolute error is returned
	for each output separately.
	If multioutput is 'uniform_average' or an ndarray of weights, then the
	weighted average of all output errors is returned.

	The pinball loss output is a non-negative floating point. The best
	value is 0.0.

	Examples
	--------
	>>> from sklearn.metrics import mean_pinball_loss
	>>> y_true = [1, 2, 3]
	>>> mean_pinball_loss(y_true, [0, 2, 3], alpha=0.1)
	np.float64(0.03...)
	>>> mean_pinball_loss(y_true, [1, 2, 4], alpha=0.1)
	np.float64(0.3...)
	>>> mean_pinball_loss(y_true, [0, 2, 3], alpha=0.9)
	np.float64(0.3...)
	>>> mean_pinball_loss(y_true, [1, 2, 4], alpha=0.9)
	np.float64(0.03...)
	>>> mean_pinball_loss(y_true, y_true, alpha=0.1)
	np.float64(0.0)
	>>> mean_pinball_loss(y_true, y_true, alpha=0.9)
	np.float64(0.0)
	"""
	y_type, y_true, y_pred, multioutput = _check_reg_targets(
	y_true, y_pred, multioutput
	)
	check_consistent_length(y_true, y_pred, sample_weight)
	diff = y_true - y_pred
	sign = (diff >= 0).astype(diff.dtype)
	loss = alpha * sign * diff - (1 - alpha) * (1 - sign) * diff
	output_errors = np.average(loss, weights=sample_weight, axis=0)

	if isinstance(multioutput, str) and multioutput == "raw_values":
	return output_errors

	if isinstance(multioutput, str) and multioutput == "uniform_average":
	# pass None as weights to np.average: uniform mean
	multioutput = None

	return np.average(output_errors, weights=multioutput)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"multioutput": [StrOptions({"raw_values", "uniform_average"}), "array-like"],
	},
	prefer_skip_nested_validation=True,
	)
	def mean_absolute_percentage_error(
	y_true, y_pred, *, sample_weight=None, multioutput="uniform_average"
	):
	"""Mean absolute percentage error (MAPE) regression loss.

	Note that we are not using the common "percentage" definition: the percentage
	in the range [0, 100] is converted to a relative value in the range [0, 1]
	by dividing by 100. Thus, an error of 200% corresponds to a relative error of 2.

	Read more in the :ref:`User Guide <mean_absolute_percentage_error>`.

	.. versionadded:: 0.24

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	multioutput : {'raw_values', 'uniform_average'} or array-like
	Defines aggregating of multiple output values.
	Array-like value defines weights used to average errors.
	If input is list then the shape must be (n_outputs,).

	'raw_values' :
	Returns a full set of errors in case of multioutput input.

	'uniform_average' :
	Errors of all outputs are averaged with uniform weight.

	Returns
	-------
	loss : float or ndarray of floats
	If multioutput is 'raw_values', then mean absolute percentage error
	is returned for each output separately.
	If multioutput is 'uniform_average' or an ndarray of weights, then the
	weighted average of all output errors is returned.

	MAPE output is non-negative floating point. The best value is 0.0.
	But note that bad predictions can lead to arbitrarily large
	MAPE values, especially if some `y_true` values are very close to zero.
	Note that we return a large value instead of `inf` when `y_true` is zero.

	Examples
	--------
	>>> from sklearn.metrics import mean_absolute_percentage_error
	>>> y_true = [3, -0.5, 2, 7]
	>>> y_pred = [2.5, 0.0, 2, 8]
	>>> mean_absolute_percentage_error(y_true, y_pred)
	0.3273...
	>>> y_true = [[0.5, 1], [-1, 1], [7, -6]]
	>>> y_pred = [[0, 2], [-1, 2], [8, -5]]
	>>> mean_absolute_percentage_error(y_true, y_pred)
	0.5515...
	>>> mean_absolute_percentage_error(y_true, y_pred, multioutput=[0.3, 0.7])
	0.6198...
	>>> # the value when some element of the y_true is zero is arbitrarily high because
	>>> # of the division by epsilon
	>>> y_true = [1., 0., 2.4, 7.]
	>>> y_pred = [1.2, 0.1, 2.4, 8.]
	>>> mean_absolute_percentage_error(y_true, y_pred)
	112589990684262.48
	"""
	xp, _ = get_namespace(y_true, y_pred, sample_weight, multioutput)
	_, y_true, y_pred, sample_weight, multioutput = (
	_check_reg_targets_with_floating_dtype(
	y_true, y_pred, sample_weight, multioutput, xp=xp
	)
	)
	check_consistent_length(y_true, y_pred, sample_weight)
	epsilon = xp.asarray(xp.finfo(xp.float64).eps, dtype=y_true.dtype)
	y_true_abs = xp.abs(y_true)
	mape = xp.abs(y_pred - y_true) / xp.maximum(y_true_abs, epsilon)
	output_errors = _average(mape, weights=sample_weight, axis=0)
	if isinstance(multioutput, str):
	if multioutput == "raw_values":
	return output_errors
	elif multioutput == "uniform_average":
	# pass None as weights to _average: uniform mean
	multioutput = None

	# Average across the outputs (if needed).
	# The second call to `_average` should always return
	# a scalar array that we convert to a Python float to
	# consistently return the same eager evaluated value.
	# Therefore, `axis=None`.
	mean_absolute_percentage_error = _average(output_errors, weights=multioutput)

	return float(mean_absolute_percentage_error)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"multioutput": [StrOptions({"raw_values", "uniform_average"}), "array-like"],
	},
	prefer_skip_nested_validation=True,
	)
	def mean_squared_error(
	y_true,
	y_pred,
	*,
	sample_weight=None,
	multioutput="uniform_average",
	):
	"""Mean squared error regression loss.

	Read more in the :ref:`User Guide <mean_squared_error>`.

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	multioutput : {'raw_values', 'uniform_average'} or array-like of shape \
	(n_outputs,), default='uniform_average'
	Defines aggregating of multiple output values.
	Array-like value defines weights used to average errors.

	'raw_values' :
	Returns a full set of errors in case of multioutput input.

	'uniform_average' :
	Errors of all outputs are averaged with uniform weight.

	Returns
	-------
	loss : float or array of floats
	A non-negative floating point value (the best value is 0.0), or an
	array of floating point values, one for each individual target.

	Examples
	--------
	>>> from sklearn.metrics import mean_squared_error
	>>> y_true = [3, -0.5, 2, 7]
	>>> y_pred = [2.5, 0.0, 2, 8]
	>>> mean_squared_error(y_true, y_pred)
	0.375
	>>> y_true = [[0.5, 1],[-1, 1],[7, -6]]
	>>> y_pred = [[0, 2],[-1, 2],[8, -5]]
	>>> mean_squared_error(y_true, y_pred)
	0.708...
	>>> mean_squared_error(y_true, y_pred, multioutput='raw_values')
	array([0.41666667, 1. ])
	>>> mean_squared_error(y_true, y_pred, multioutput=[0.3, 0.7])
	0.825...
	"""
	xp, _ = get_namespace(y_true, y_pred, sample_weight, multioutput)
	_, y_true, y_pred, sample_weight, multioutput = (
	_check_reg_targets_with_floating_dtype(
	y_true, y_pred, sample_weight, multioutput, xp=xp
	)
	)
	check_consistent_length(y_true, y_pred, sample_weight)
	output_errors = _average((y_true - y_pred) ** 2, axis=0, weights=sample_weight)

	if isinstance(multioutput, str):
	if multioutput == "raw_values":
	return output_errors
	elif multioutput == "uniform_average":
	# pass None as weights to _average: uniform mean
	multioutput = None

	# Average across the outputs (if needed).
	# The second call to `_average` should always return
	# a scalar array that we convert to a Python float to
	# consistently return the same eager evaluated value.
	# Therefore, `axis=None`.
	mean_squared_error = _average(output_errors, weights=multioutput)

	return float(mean_squared_error)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"multioutput": [StrOptions({"raw_values", "uniform_average"}), "array-like"],
	},
	prefer_skip_nested_validation=True,
	)
	def root_mean_squared_error(
	y_true, y_pred, *, sample_weight=None, multioutput="uniform_average"
	):
	"""Root mean squared error regression loss.

	Read more in the :ref:`User Guide <mean_squared_error>`.

	.. versionadded:: 1.4

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	multioutput : {'raw_values', 'uniform_average'} or array-like of shape \
	(n_outputs,), default='uniform_average'
	Defines aggregating of multiple output values.
	Array-like value defines weights used to average errors.

	'raw_values' :
	Returns a full set of errors in case of multioutput input.

	'uniform_average' :
	Errors of all outputs are averaged with uniform weight.

	Returns
	-------
	loss : float or ndarray of floats
	A non-negative floating point value (the best value is 0.0), or an
	array of floating point values, one for each individual target.

	Examples
	--------
	>>> from sklearn.metrics import root_mean_squared_error
	>>> y_true = [3, -0.5, 2, 7]
	>>> y_pred = [2.5, 0.0, 2, 8]
	>>> root_mean_squared_error(y_true, y_pred)
	0.612...
	>>> y_true = [[0.5, 1],[-1, 1],[7, -6]]
	>>> y_pred = [[0, 2],[-1, 2],[8, -5]]
	>>> root_mean_squared_error(y_true, y_pred)
	0.822...
	"""

	xp, _ = get_namespace(y_true, y_pred, sample_weight, multioutput)

	output_errors = xp.sqrt(
	mean_squared_error(
	y_true, y_pred, sample_weight=sample_weight, multioutput="raw_values"
	)
	)

	if isinstance(multioutput, str):
	if multioutput == "raw_values":
	return output_errors
	elif multioutput == "uniform_average":
	# pass None as weights to _average: uniform mean
	multioutput = None

	# Average across the outputs (if needed).
	# The second call to `_average` should always return
	# a scalar array that we convert to a Python float to
	# consistently return the same eager evaluated value.
	# Therefore, `axis=None`.
	root_mean_squared_error = _average(output_errors, weights=multioutput)

	return float(root_mean_squared_error)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"multioutput": [StrOptions({"raw_values", "uniform_average"}), "array-like"],
	},
	prefer_skip_nested_validation=True,
	)
	def mean_squared_log_error(
	y_true,
	y_pred,
	*,
	sample_weight=None,
	multioutput="uniform_average",
	):
	"""Mean squared logarithmic error regression loss.

	Read more in the :ref:`User Guide <mean_squared_log_error>`.

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	multioutput : {'raw_values', 'uniform_average'} or array-like of shape \
	(n_outputs,), default='uniform_average'

	Defines aggregating of multiple output values.
	Array-like value defines weights used to average errors.

	'raw_values' :
	Returns a full set of errors when the input is of multioutput
	format.

	'uniform_average' :
	Errors of all outputs are averaged with uniform weight.

	Returns
	-------
	loss : float or ndarray of floats
	A non-negative floating point value (the best value is 0.0), or an
	array of floating point values, one for each individual target.

	Examples
	--------
	>>> from sklearn.metrics import mean_squared_log_error
	>>> y_true = [3, 5, 2.5, 7]
	>>> y_pred = [2.5, 5, 4, 8]
	>>> mean_squared_log_error(y_true, y_pred)
	0.039...
	>>> y_true = [[0.5, 1], [1, 2], [7, 6]]
	>>> y_pred = [[0.5, 2], [1, 2.5], [8, 8]]
	>>> mean_squared_log_error(y_true, y_pred)
	0.044...
	>>> mean_squared_log_error(y_true, y_pred, multioutput='raw_values')
	array([0.00462428, 0.08377444])
	>>> mean_squared_log_error(y_true, y_pred, multioutput=[0.3, 0.7])
	0.060...
	"""
	xp, _ = get_namespace(y_true, y_pred)

	_, y_true, y_pred, _, _ = _check_reg_targets_with_floating_dtype(
	y_true, y_pred, sample_weight, multioutput, xp=xp
	)

	if xp.any(y_true <= -1) or xp.any(y_pred <= -1):
	raise ValueError(
	"Mean Squared Logarithmic Error cannot be used when "
	"targets contain values less than or equal to -1."
	)

	return mean_squared_error(
	xp.log1p(y_true),
	xp.log1p(y_pred),
	sample_weight=sample_weight,
	multioutput=multioutput,
	)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"multioutput": [StrOptions({"raw_values", "uniform_average"}), "array-like"],
	},
	prefer_skip_nested_validation=True,
	)
	def root_mean_squared_log_error(
	y_true, y_pred, *, sample_weight=None, multioutput="uniform_average"
	):
	"""Root mean squared logarithmic error regression loss.

	Read more in the :ref:`User Guide <mean_squared_log_error>`.

	.. versionadded:: 1.4

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	multioutput : {'raw_values', 'uniform_average'} or array-like of shape \
	(n_outputs,), default='uniform_average'

	Defines aggregating of multiple output values.
	Array-like value defines weights used to average errors.

	'raw_values' :
	Returns a full set of errors when the input is of multioutput
	format.

	'uniform_average' :
	Errors of all outputs are averaged with uniform weight.

	Returns
	-------
	loss : float or ndarray of floats
	A non-negative floating point value (the best value is 0.0), or an
	array of floating point values, one for each individual target.

	Examples
	--------
	>>> from sklearn.metrics import root_mean_squared_log_error
	>>> y_true = [3, 5, 2.5, 7]
	>>> y_pred = [2.5, 5, 4, 8]
	>>> root_mean_squared_log_error(y_true, y_pred)
	0.199...
	"""
	xp, _ = get_namespace(y_true, y_pred)

	_, y_true, y_pred, _, _ = _check_reg_targets_with_floating_dtype(
	y_true, y_pred, sample_weight, multioutput, xp=xp
	)

	if xp.any(y_true <= -1) or xp.any(y_pred <= -1):
	raise ValueError(
	"Root Mean Squared Logarithmic Error cannot be used when "
	"targets contain values less than or equal to -1."
	)

	return root_mean_squared_error(
	xp.log1p(y_true),
	xp.log1p(y_pred),
	sample_weight=sample_weight,
	multioutput=multioutput,
	)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"multioutput": [StrOptions({"raw_values", "uniform_average"}), "array-like"],
	"sample_weight": ["array-like", None],
	},
	prefer_skip_nested_validation=True,
	)
	def median_absolute_error(
	y_true, y_pred, *, multioutput="uniform_average", sample_weight=None
	):
	"""Median absolute error regression loss.

	Median absolute error output is non-negative floating point. The best value
	is 0.0. Read more in the :ref:`User Guide <median_absolute_error>`.

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	multioutput : {'raw_values', 'uniform_average'} or array-like of shape \
	(n_outputs,), default='uniform_average'
	Defines aggregating of multiple output values. Array-like value defines
	weights used to average errors.

	'raw_values' :
	Returns a full set of errors in case of multioutput input.

	'uniform_average' :
	Errors of all outputs are averaged with uniform weight.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	.. versionadded:: 0.24

	Returns
	-------
	loss : float or ndarray of floats
	If multioutput is 'raw_values', then mean absolute error is returned
	for each output separately.
	If multioutput is 'uniform_average' or an ndarray of weights, then the
	weighted average of all output errors is returned.

	Examples
	--------
	>>> from sklearn.metrics import median_absolute_error
	>>> y_true = [3, -0.5, 2, 7]
	>>> y_pred = [2.5, 0.0, 2, 8]
	>>> median_absolute_error(y_true, y_pred)
	np.float64(0.5)
	>>> y_true = [[0.5, 1], [-1, 1], [7, -6]]
	>>> y_pred = [[0, 2], [-1, 2], [8, -5]]
	>>> median_absolute_error(y_true, y_pred)
	np.float64(0.75)
	>>> median_absolute_error(y_true, y_pred, multioutput='raw_values')
	array([0.5, 1. ])
	>>> median_absolute_error(y_true, y_pred, multioutput=[0.3, 0.7])
	np.float64(0.85)
	"""
	y_type, y_true, y_pred, multioutput = _check_reg_targets(
	y_true, y_pred, multioutput
	)
	if sample_weight is None:
	output_errors = np.median(np.abs(y_pred - y_true), axis=0)
	else:
	sample_weight = _check_sample_weight(sample_weight, y_pred)
	output_errors = _weighted_percentile(
	np.abs(y_pred - y_true), sample_weight=sample_weight
	)
	if isinstance(multioutput, str):
	if multioutput == "raw_values":
	return output_errors
	elif multioutput == "uniform_average":
	# pass None as weights to np.average: uniform mean
	multioutput = None

	return np.average(output_errors, weights=multioutput)


	def _assemble_r2_explained_variance(
	numerator, denominator, n_outputs, multioutput, force_finite, xp, device
	):
	"""Common part used by explained variance score and :math:`R^2` score."""
	dtype = numerator.dtype

	nonzero_denominator = denominator != 0

	if not force_finite:
	# Standard formula, that may lead to NaN or -Inf
	output_scores = 1 - (numerator / denominator)
	else:
	nonzero_numerator = numerator != 0
	# Default = Zero Numerator = perfect predictions. Set to 1.0
	# (note: even if denominator is zero, thus avoiding NaN scores)
	output_scores = xp.ones([n_outputs], device=device, dtype=dtype)
	# Non-zero Numerator and Non-zero Denominator: use the formula
	valid_score = nonzero_denominator & nonzero_numerator

	output_scores[valid_score] = 1 - (
	numerator[valid_score] / denominator[valid_score]
	)

	# Non-zero Numerator and Zero Denominator:
	# arbitrary set to 0.0 to avoid -inf scores
	output_scores[nonzero_numerator & ~nonzero_denominator] = 0.0

	if isinstance(multioutput, str):
	if multioutput == "raw_values":
	# return scores individually
	return output_scores
	elif multioutput == "uniform_average":
	# Passing None as weights to np.average results is uniform mean
	avg_weights = None
	elif multioutput == "variance_weighted":
	avg_weights = denominator
	if not xp.any(nonzero_denominator):
	# All weights are zero, np.average would raise a ZeroDiv error.
	# This only happens when all y are constant (or 1-element long)
	# Since weights are all equal, fall back to uniform weights.
	avg_weights = None
	else:
	avg_weights = multioutput

	result = _average(output_scores, weights=avg_weights)
	if size(result) == 1:
	return float(result)
	return result


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"multioutput": [
	StrOptions({"raw_values", "uniform_average", "variance_weighted"}),
	"array-like",
	],
	"force_finite": ["boolean"],
	},
	prefer_skip_nested_validation=True,
	)
	def explained_variance_score(
	y_true,
	y_pred,
	*,
	sample_weight=None,
	multioutput="uniform_average",
	force_finite=True,
	):
	"""Explained variance regression score function.

	Best possible score is 1.0, lower values are worse.

	In the particular case when ``y_true`` is constant, the explained variance
	score is not finite: it is either ``NaN`` (perfect predictions) or
	``-Inf`` (imperfect predictions). To prevent such non-finite numbers to
	pollute higher-level experiments such as a grid search cross-validation,
	by default these cases are replaced with 1.0 (perfect predictions) or 0.0
	(imperfect predictions) respectively. If ``force_finite``
	is set to ``False``, this score falls back on the original :math:`R^2`
	definition.

	.. note::
	The Explained Variance score is similar to the
	:func:`R^2 score <r2_score>`, with the notable difference that it
	does not account for systematic offsets in the prediction. Most often
	the :func:`R^2 score <r2_score>` should be preferred.

	Read more in the :ref:`User Guide <explained_variance_score>`.

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	multioutput : {'raw_values', 'uniform_average', 'variance_weighted'} or \
	array-like of shape (n_outputs,), default='uniform_average'
	Defines aggregating of multiple output scores.
	Array-like value defines weights used to average scores.

	'raw_values' :
	Returns a full set of scores in case of multioutput input.

	'uniform_average' :
	Scores of all outputs are averaged with uniform weight.

	'variance_weighted' :
	Scores of all outputs are averaged, weighted by the variances
	of each individual output.

	force_finite : bool, default=True
	Flag indicating if ``NaN`` and ``-Inf`` scores resulting from constant
	data should be replaced with real numbers (``1.0`` if prediction is
	perfect, ``0.0`` otherwise). Default is ``True``, a convenient setting
	for hyperparameters' search procedures (e.g. grid search
	cross-validation).

	.. versionadded:: 1.1

	Returns
	-------
	score : float or ndarray of floats
	The explained variance or ndarray if 'multioutput' is 'raw_values'.

	See Also
	--------
	r2_score :
	Similar metric, but accounting for systematic offsets in
	prediction.

	Notes
	-----
	This is not a symmetric function.

	Examples
	--------
	>>> from sklearn.metrics import explained_variance_score
	>>> y_true = [3, -0.5, 2, 7]
	>>> y_pred = [2.5, 0.0, 2, 8]
	>>> explained_variance_score(y_true, y_pred)
	0.957...
	>>> y_true = [[0.5, 1], [-1, 1], [7, -6]]
	>>> y_pred = [[0, 2], [-1, 2], [8, -5]]
	>>> explained_variance_score(y_true, y_pred, multioutput='uniform_average')
	0.983...
	>>> y_true = [-2, -2, -2]
	>>> y_pred = [-2, -2, -2]
	>>> explained_variance_score(y_true, y_pred)
	1.0
	>>> explained_variance_score(y_true, y_pred, force_finite=False)
	nan
	>>> y_true = [-2, -2, -2]
	>>> y_pred = [-2, -2, -2 + 1e-8]
	>>> explained_variance_score(y_true, y_pred)
	0.0
	>>> explained_variance_score(y_true, y_pred, force_finite=False)
	-inf
	"""
	y_type, y_true, y_pred, multioutput = _check_reg_targets(
	y_true, y_pred, multioutput
	)
	check_consistent_length(y_true, y_pred, sample_weight)

	y_diff_avg = np.average(y_true - y_pred, weights=sample_weight, axis=0)
	numerator = np.average(
	(y_true - y_pred - y_diff_avg) ** 2, weights=sample_weight, axis=0
	)

	y_true_avg = np.average(y_true, weights=sample_weight, axis=0)
	denominator = np.average((y_true - y_true_avg) ** 2, weights=sample_weight, axis=0)

	return _assemble_r2_explained_variance(
	numerator=numerator,
	denominator=denominator,
	n_outputs=y_true.shape[1],
	multioutput=multioutput,
	force_finite=force_finite,
	xp=get_namespace(y_true)[0],
	# TODO: update once Array API support is added to explained_variance_score.
	device=None,
	)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"multioutput": [
	StrOptions({"raw_values", "uniform_average", "variance_weighted"}),
	"array-like",
	None,
	],
	"force_finite": ["boolean"],
	},
	prefer_skip_nested_validation=True,
	)
	def r2_score(
	y_true,
	y_pred,
	*,
	sample_weight=None,
	multioutput="uniform_average",
	force_finite=True,
	):
	""":math:`R^2` (coefficient of determination) regression score function.

	Best possible score is 1.0 and it can be negative (because the
	model can be arbitrarily worse). In the general case when the true y is
	non-constant, a constant model that always predicts the average y
	disregarding the input features would get a :math:`R^2` score of 0.0.

	In the particular case when ``y_true`` is constant, the :math:`R^2` score
	is not finite: it is either ``NaN`` (perfect predictions) or ``-Inf``
	(imperfect predictions). To prevent such non-finite numbers to pollute
	higher-level experiments such as a grid search cross-validation, by default
	these cases are replaced with 1.0 (perfect predictions) or 0.0 (imperfect
	predictions) respectively. You can set ``force_finite`` to ``False`` to
	prevent this fix from happening.

	Note: when the prediction residuals have zero mean, the :math:`R^2` score
	is identical to the
	:func:`Explained Variance score <explained_variance_score>`.

	Read more in the :ref:`User Guide <r2_score>`.

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	multioutput : {'raw_values', 'uniform_average', 'variance_weighted'}, \
	array-like of shape (n_outputs,) or None, default='uniform_average'

	Defines aggregating of multiple output scores.
	Array-like value defines weights used to average scores.
	Default is "uniform_average".

	'raw_values' :
	Returns a full set of scores in case of multioutput input.

	'uniform_average' :
	Scores of all outputs are averaged with uniform weight.

	'variance_weighted' :
	Scores of all outputs are averaged, weighted by the variances
	of each individual output.

	.. versionchanged:: 0.19
	Default value of multioutput is 'uniform_average'.

	force_finite : bool, default=True
	Flag indicating if ``NaN`` and ``-Inf`` scores resulting from constant
	data should be replaced with real numbers (``1.0`` if prediction is
	perfect, ``0.0`` otherwise). Default is ``True``, a convenient setting
	for hyperparameters' search procedures (e.g. grid search
	cross-validation).

	.. versionadded:: 1.1

	Returns
	-------
	z : float or ndarray of floats
	The :math:`R^2` score or ndarray of scores if 'multioutput' is
	'raw_values'.

	Notes
	-----
	This is not a symmetric function.

	Unlike most other scores, :math:`R^2` score may be negative (it need not
	actually be the square of a quantity R).

	This metric is not well-defined for single samples and will return a NaN
	value if n_samples is less than two.

	References
	----------
	.. [1] `Wikipedia entry on the Coefficient of determination
	<https://en.wikipedia.org/wiki/Coefficient_of_determination>`_

	Examples
	--------
	>>> from sklearn.metrics import r2_score
	>>> y_true = [3, -0.5, 2, 7]
	>>> y_pred = [2.5, 0.0, 2, 8]
	>>> r2_score(y_true, y_pred)
	0.948...
	>>> y_true = [[0.5, 1], [-1, 1], [7, -6]]
	>>> y_pred = [[0, 2], [-1, 2], [8, -5]]
	>>> r2_score(y_true, y_pred,
	... multioutput='variance_weighted')
	0.938...
	>>> y_true = [1, 2, 3]
	>>> y_pred = [1, 2, 3]
	>>> r2_score(y_true, y_pred)
	1.0
	>>> y_true = [1, 2, 3]
	>>> y_pred = [2, 2, 2]
	>>> r2_score(y_true, y_pred)
	0.0
	>>> y_true = [1, 2, 3]
	>>> y_pred = [3, 2, 1]
	>>> r2_score(y_true, y_pred)
	-3.0
	>>> y_true = [-2, -2, -2]
	>>> y_pred = [-2, -2, -2]
	>>> r2_score(y_true, y_pred)
	1.0
	>>> r2_score(y_true, y_pred, force_finite=False)
	nan
	>>> y_true = [-2, -2, -2]
	>>> y_pred = [-2, -2, -2 + 1e-8]
	>>> r2_score(y_true, y_pred)
	0.0
	>>> r2_score(y_true, y_pred, force_finite=False)
	-inf
	"""
	xp, _, device_ = get_namespace_and_device(
	y_true, y_pred, sample_weight, multioutput
	)

	_, y_true, y_pred, sample_weight, multioutput = (
	_check_reg_targets_with_floating_dtype(
	y_true, y_pred, sample_weight, multioutput, xp=xp
	)
	)

	check_consistent_length(y_true, y_pred, sample_weight)

	if _num_samples(y_pred) < 2:
	msg = "R^2 score is not well-defined with less than two samples."
	warnings.warn(msg, UndefinedMetricWarning)
	return float("nan")

	if sample_weight is not None:
	sample_weight = column_or_1d(sample_weight)
	weight = sample_weight[:, None]
	else:
	weight = 1.0

	numerator = xp.sum(weight * (y_true - y_pred) ** 2, axis=0)
	denominator = xp.sum(
	weight * (y_true - _average(y_true, axis=0, weights=sample_weight, xp=xp)) ** 2,
	axis=0,
	)

	return _assemble_r2_explained_variance(
	numerator=numerator,
	denominator=denominator,
	n_outputs=y_true.shape[1],
	multioutput=multioutput,
	force_finite=force_finite,
	xp=xp,
	device=device_,
	)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	},
	prefer_skip_nested_validation=True,
	)
	def max_error(y_true, y_pred):
	"""
	The max_error metric calculates the maximum residual error.

	Read more in the :ref:`User Guide <max_error>`.

	Parameters
	----------
	y_true : array-like of shape (n_samples,)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,)
	Estimated target values.

	Returns
	-------
	max_error : float
	A positive floating point value (the best value is 0.0).

	Examples
	--------
	>>> from sklearn.metrics import max_error
	>>> y_true = [3, 2, 7, 1]
	>>> y_pred = [4, 2, 7, 1]
	>>> max_error(y_true, y_pred)
	np.int64(1)
	"""
	xp, _ = get_namespace(y_true, y_pred)
	y_type, y_true, y_pred, _ = _check_reg_targets(y_true, y_pred, None, xp=xp)
	if y_type == "continuous-multioutput":
	raise ValueError("Multioutput not supported in max_error")
	return xp.max(xp.abs(y_true - y_pred))


	def _mean_tweedie_deviance(y_true, y_pred, sample_weight, power):
	"""Mean Tweedie deviance regression loss."""
	xp, _ = get_namespace(y_true, y_pred)
	p = power
	zero = xp.asarray(0, dtype=y_true.dtype)
	if p < 0:
	# 'Extreme stable', y any real number, y_pred > 0
	dev = 2 * (
	xp.pow(xp.where(y_true > 0, y_true, zero), xp.asarray(2 - p))
	/ ((1 - p) * (2 - p))
	- y_true * xp.pow(y_pred, xp.asarray(1 - p)) / (1 - p)
	+ xp.pow(y_pred, xp.asarray(2 - p)) / (2 - p)
	)
	elif p == 0:
	# Normal distribution, y and y_pred any real number
	dev = (y_true - y_pred) ** 2
	elif p == 1:
	# Poisson distribution
	dev = 2 * (xlogy(y_true, y_true / y_pred) - y_true + y_pred)
	elif p == 2:
	# Gamma distribution
	dev = 2 * (xp.log(y_pred / y_true) + y_true / y_pred - 1)
	else:
	dev = 2 * (
	xp.pow(y_true, xp.asarray(2 - p)) / ((1 - p) * (2 - p))
	- y_true * xp.pow(y_pred, xp.asarray(1 - p)) / (1 - p)
	+ xp.pow(y_pred, xp.asarray(2 - p)) / (2 - p)
	)
	return float(_average(dev, weights=sample_weight))


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"power": [
	Interval(Real, None, 0, closed="right"),
	Interval(Real, 1, None, closed="left"),
	],
	},
	prefer_skip_nested_validation=True,
	)
	def mean_tweedie_deviance(y_true, y_pred, *, sample_weight=None, power=0):
	"""Mean Tweedie deviance regression loss.

	Read more in the :ref:`User Guide <mean_tweedie_deviance>`.

	Parameters
	----------
	y_true : array-like of shape (n_samples,)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	power : float, default=0
	Tweedie power parameter. Either power <= 0 or power >= 1.

	The higher `p` the less weight is given to extreme
	deviations between true and predicted targets.

	- power < 0: Extreme stable distribution. Requires: y_pred > 0.
	- power = 0 : Normal distribution, output corresponds to
	mean_squared_error. y_true and y_pred can be any real numbers.
	- power = 1 : Poisson distribution. Requires: y_true >= 0 and
	y_pred > 0.
	- 1 < p < 2 : Compound Poisson distribution. Requires: y_true >= 0
	and y_pred > 0.
	- power = 2 : Gamma distribution. Requires: y_true > 0 and y_pred > 0.
	- power = 3 : Inverse Gaussian distribution. Requires: y_true > 0
	and y_pred > 0.
	- otherwise : Positive stable distribution. Requires: y_true > 0
	and y_pred > 0.

	Returns
	-------
	loss : float
	A non-negative floating point value (the best value is 0.0).

	Examples
	--------
	>>> from sklearn.metrics import mean_tweedie_deviance
	>>> y_true = [2, 0, 1, 4]
	>>> y_pred = [0.5, 0.5, 2., 2.]
	>>> mean_tweedie_deviance(y_true, y_pred, power=1)
	1.4260...
	"""
	xp, _ = get_namespace(y_true, y_pred)
	y_type, y_true, y_pred, sample_weight, _ = _check_reg_targets_with_floating_dtype(
	y_true, y_pred, sample_weight, multioutput=None, xp=xp
	)
	if y_type == "continuous-multioutput":
	raise ValueError("Multioutput not supported in mean_tweedie_deviance")
	check_consistent_length(y_true, y_pred, sample_weight)

	if sample_weight is not None:
	sample_weight = column_or_1d(sample_weight)
	sample_weight = sample_weight[:, np.newaxis]

	message = f"Mean Tweedie deviance error with power={power} can only be used on "
	if power < 0:
	# 'Extreme stable', y any real number, y_pred > 0
	if xp.any(y_pred <= 0):
	raise ValueError(message + "strictly positive y_pred.")
	elif power == 0:
	# Normal, y and y_pred can be any real number
	pass
	elif 1 <= power < 2:
	# Poisson and compound Poisson distribution, y >= 0, y_pred > 0
	if xp.any(y_true < 0) or xp.any(y_pred <= 0):
	raise ValueError(message + "non-negative y and strictly positive y_pred.")
	elif power >= 2:
	# Gamma and Extreme stable distribution, y and y_pred > 0
	if xp.any(y_true <= 0) or xp.any(y_pred <= 0):
	raise ValueError(message + "strictly positive y and y_pred.")
	else: # pragma: nocover
	# Unreachable statement
	raise ValueError

	return _mean_tweedie_deviance(
	y_true, y_pred, sample_weight=sample_weight, power=power
	)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	},
	prefer_skip_nested_validation=True,
	)
	def mean_poisson_deviance(y_true, y_pred, *, sample_weight=None):
	"""Mean Poisson deviance regression loss.

	Poisson deviance is equivalent to the Tweedie deviance with
	the power parameter `power=1`.

	Read more in the :ref:`User Guide <mean_tweedie_deviance>`.

	Parameters
	----------
	y_true : array-like of shape (n_samples,)
	Ground truth (correct) target values. Requires y_true >= 0.

	y_pred : array-like of shape (n_samples,)
	Estimated target values. Requires y_pred > 0.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	Returns
	-------
	loss : float
	A non-negative floating point value (the best value is 0.0).

	Examples
	--------
	>>> from sklearn.metrics import mean_poisson_deviance
	>>> y_true = [2, 0, 1, 4]
	>>> y_pred = [0.5, 0.5, 2., 2.]
	>>> mean_poisson_deviance(y_true, y_pred)
	1.4260...
	"""
	return mean_tweedie_deviance(y_true, y_pred, sample_weight=sample_weight, power=1)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	},
	prefer_skip_nested_validation=True,
	)
	def mean_gamma_deviance(y_true, y_pred, *, sample_weight=None):
	"""Mean Gamma deviance regression loss.

	Gamma deviance is equivalent to the Tweedie deviance with
	the power parameter `power=2`. It is invariant to scaling of
	the target variable, and measures relative errors.

	Read more in the :ref:`User Guide <mean_tweedie_deviance>`.

	Parameters
	----------
	y_true : array-like of shape (n_samples,)
	Ground truth (correct) target values. Requires y_true > 0.

	y_pred : array-like of shape (n_samples,)
	Estimated target values. Requires y_pred > 0.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	Returns
	-------
	loss : float
	A non-negative floating point value (the best value is 0.0).

	Examples
	--------
	>>> from sklearn.metrics import mean_gamma_deviance
	>>> y_true = [2, 0.5, 1, 4]
	>>> y_pred = [0.5, 0.5, 2., 2.]
	>>> mean_gamma_deviance(y_true, y_pred)
	1.0568...
	"""
	return mean_tweedie_deviance(y_true, y_pred, sample_weight=sample_weight, power=2)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"power": [
	Interval(Real, None, 0, closed="right"),
	Interval(Real, 1, None, closed="left"),
	],
	},
	prefer_skip_nested_validation=True,
	)
	def d2_tweedie_score(y_true, y_pred, *, sample_weight=None, power=0):
	"""
	:math:`D^2` regression score function, fraction of Tweedie deviance explained.

	Best possible score is 1.0 and it can be negative (because the model can be
	arbitrarily worse). A model that always uses the empirical mean of `y_true` as
	constant prediction, disregarding the input features, gets a D^2 score of 0.0.

	Read more in the :ref:`User Guide <d2_score>`.

	.. versionadded:: 1.0

	Parameters
	----------
	y_true : array-like of shape (n_samples,)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	power : float, default=0
	Tweedie power parameter. Either power <= 0 or power >= 1.

	The higher `p` the less weight is given to extreme
	deviations between true and predicted targets.

	- power < 0: Extreme stable distribution. Requires: y_pred > 0.
	- power = 0 : Normal distribution, output corresponds to r2_score.
	y_true and y_pred can be any real numbers.
	- power = 1 : Poisson distribution. Requires: y_true >= 0 and
	y_pred > 0.
	- 1 < p < 2 : Compound Poisson distribution. Requires: y_true >= 0
	and y_pred > 0.
	- power = 2 : Gamma distribution. Requires: y_true > 0 and y_pred > 0.
	- power = 3 : Inverse Gaussian distribution. Requires: y_true > 0
	and y_pred > 0.
	- otherwise : Positive stable distribution. Requires: y_true > 0
	and y_pred > 0.

	Returns
	-------
	z : float or ndarray of floats
	The D^2 score.

	Notes
	-----
	This is not a symmetric function.

	Like R^2, D^2 score may be negative (it need not actually be the square of
	a quantity D).

	This metric is not well-defined for single samples and will return a NaN
	value if n_samples is less than two.

	References
	----------
	.. [1] Eq. (3.11) of Hastie, Trevor J., Robert Tibshirani and Martin J.
	Wainwright. "Statistical Learning with Sparsity: The Lasso and
	Generalizations." (2015). https://hastie.su.domains/StatLearnSparsity/

	Examples
	--------
	>>> from sklearn.metrics import d2_tweedie_score
	>>> y_true = [0.5, 1, 2.5, 7]
	>>> y_pred = [1, 1, 5, 3.5]
	>>> d2_tweedie_score(y_true, y_pred)
	0.285...
	>>> d2_tweedie_score(y_true, y_pred, power=1)
	0.487...
	>>> d2_tweedie_score(y_true, y_pred, power=2)
	0.630...
	>>> d2_tweedie_score(y_true, y_true, power=2)
	1.0
	"""
	xp, _ = get_namespace(y_true, y_pred)

	y_type, y_true, y_pred, sample_weight, _ = _check_reg_targets_with_floating_dtype(
	y_true, y_pred, sample_weight, multioutput=None, xp=xp
	)
	if y_type == "continuous-multioutput":
	raise ValueError("Multioutput not supported in d2_tweedie_score")

	if _num_samples(y_pred) < 2:
	msg = "D^2 score is not well-defined with less than two samples."
	warnings.warn(msg, UndefinedMetricWarning)
	return float("nan")

	y_true, y_pred = xp.squeeze(y_true, axis=1), xp.squeeze(y_pred, axis=1)
	numerator = mean_tweedie_deviance(
	y_true, y_pred, sample_weight=sample_weight, power=power
	)

	y_avg = _average(y_true, weights=sample_weight, xp=xp)
	denominator = _mean_tweedie_deviance(
	y_true, y_avg, sample_weight=sample_weight, power=power
	)

	return 1 - numerator / denominator


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"alpha": [Interval(Real, 0, 1, closed="both")],
	"multioutput": [
	StrOptions({"raw_values", "uniform_average"}),
	"array-like",
	],
	},
	prefer_skip_nested_validation=True,
	)
	def d2_pinball_score(
	y_true, y_pred, *, sample_weight=None, alpha=0.5, multioutput="uniform_average"
	):
	"""
	:math:`D^2` regression score function, fraction of pinball loss explained.

	Best possible score is 1.0 and it can be negative (because the model can be
	arbitrarily worse). A model that always uses the empirical alpha-quantile of
	`y_true` as constant prediction, disregarding the input features,
	gets a :math:`D^2` score of 0.0.

	Read more in the :ref:`User Guide <d2_score>`.

	.. versionadded:: 1.1

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	alpha : float, default=0.5
	Slope of the pinball deviance. It determines the quantile level alpha
	for which the pinball deviance and also D2 are optimal.
	The default `alpha=0.5` is equivalent to `d2_absolute_error_score`.

	multioutput : {'raw_values', 'uniform_average'} or array-like of shape \
	(n_outputs,), default='uniform_average'
	Defines aggregating of multiple output values.
	Array-like value defines weights used to average scores.

	'raw_values' :
	Returns a full set of errors in case of multioutput input.

	'uniform_average' :
	Scores of all outputs are averaged with uniform weight.

	Returns
	-------
	score : float or ndarray of floats
	The :math:`D^2` score with a pinball deviance
	or ndarray of scores if `multioutput='raw_values'`.

	Notes
	-----
	Like :math:`R^2`, :math:`D^2` score may be negative
	(it need not actually be the square of a quantity D).

	This metric is not well-defined for a single point and will return a NaN
	value if n_samples is less than two.

	References
	----------
	.. [1] Eq. (7) of `Koenker, Roger; Machado, José A. F. (1999).
	"Goodness of Fit and Related Inference Processes for Quantile Regression"
	<https://doi.org/10.1080/01621459.1999.10473882>`_
	.. [2] Eq. (3.11) of Hastie, Trevor J., Robert Tibshirani and Martin J.
	Wainwright. "Statistical Learning with Sparsity: The Lasso and
	Generalizations." (2015). https://hastie.su.domains/StatLearnSparsity/

	Examples
	--------
	>>> from sklearn.metrics import d2_pinball_score
	>>> y_true = [1, 2, 3]
	>>> y_pred = [1, 3, 3]
	>>> d2_pinball_score(y_true, y_pred)
	np.float64(0.5)
	>>> d2_pinball_score(y_true, y_pred, alpha=0.9)
	np.float64(0.772...)
	>>> d2_pinball_score(y_true, y_pred, alpha=0.1)
	np.float64(-1.045...)
	>>> d2_pinball_score(y_true, y_true, alpha=0.1)
	np.float64(1.0)
	"""
	y_type, y_true, y_pred, multioutput = _check_reg_targets(
	y_true, y_pred, multioutput
	)
	check_consistent_length(y_true, y_pred, sample_weight)

	if _num_samples(y_pred) < 2:
	msg = "D^2 score is not well-defined with less than two samples."
	warnings.warn(msg, UndefinedMetricWarning)
	return float("nan")

	numerator = mean_pinball_loss(
	y_true,
	y_pred,
	sample_weight=sample_weight,
	alpha=alpha,
	multioutput="raw_values",
	)

	if sample_weight is None:
	y_quantile = np.tile(
	np.percentile(y_true, q=alpha * 100, axis=0), (len(y_true), 1)
	)
	else:
	sample_weight = _check_sample_weight(sample_weight, y_true)
	y_quantile = np.tile(
	_weighted_percentile(
	y_true, sample_weight=sample_weight, percentile=alpha * 100
	),
	(len(y_true), 1),
	)

	denominator = mean_pinball_loss(
	y_true,
	y_quantile,
	sample_weight=sample_weight,
	alpha=alpha,
	multioutput="raw_values",
	)

	nonzero_numerator = numerator != 0
	nonzero_denominator = denominator != 0
	valid_score = nonzero_numerator & nonzero_denominator
	output_scores = np.ones(y_true.shape[1])

	output_scores[valid_score] = 1 - (numerator[valid_score] / denominator[valid_score])
	output_scores[nonzero_numerator & ~nonzero_denominator] = 0.0

	if isinstance(multioutput, str):
	if multioutput == "raw_values":
	# return scores individually
	return output_scores
	else: # multioutput == "uniform_average"
	# passing None as weights to np.average results in uniform mean
	avg_weights = None
	else:
	avg_weights = multioutput

	return np.average(output_scores, weights=avg_weights)


	@validate_params(
	{
	"y_true": ["array-like"],
	"y_pred": ["array-like"],
	"sample_weight": ["array-like", None],
	"multioutput": [
	StrOptions({"raw_values", "uniform_average"}),
	"array-like",
	],
	},
	prefer_skip_nested_validation=True,
	)
	def d2_absolute_error_score(
	y_true, y_pred, *, sample_weight=None, multioutput="uniform_average"
	):
	"""
	:math:`D^2` regression score function, fraction of absolute error explained.

	Best possible score is 1.0 and it can be negative (because the model can be
	arbitrarily worse). A model that always uses the empirical median of `y_true`
	as constant prediction, disregarding the input features,
	gets a :math:`D^2` score of 0.0.

	Read more in the :ref:`User Guide <d2_score>`.

	.. versionadded:: 1.1

	Parameters
	----------
	y_true : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Ground truth (correct) target values.

	y_pred : array-like of shape (n_samples,) or (n_samples, n_outputs)
	Estimated target values.

	sample_weight : array-like of shape (n_samples,), default=None
	Sample weights.

	multioutput : {'raw_values', 'uniform_average'} or array-like of shape \
	(n_outputs,), default='uniform_average'
	Defines aggregating of multiple output values.
	Array-like value defines weights used to average scores.

	'raw_values' :
	Returns a full set of errors in case of multioutput input.

	'uniform_average' :
	Scores of all outputs are averaged with uniform weight.

	Returns
	-------
	score : float or ndarray of floats
	The :math:`D^2` score with an absolute error deviance
	or ndarray of scores if 'multioutput' is 'raw_values'.

	Notes
	-----
	Like :math:`R^2`, :math:`D^2` score may be negative
	(it need not actually be the square of a quantity D).

	This metric is not well-defined for single samples and will return a NaN
	value if n_samples is less than two.

	References
	----------
	.. [1] Eq. (3.11) of Hastie, Trevor J., Robert Tibshirani and Martin J.
	Wainwright. "Statistical Learning with Sparsity: The Lasso and
	Generalizations." (2015). https://hastie.su.domains/StatLearnSparsity/

	Examples
	--------
	>>> from sklearn.metrics import d2_absolute_error_score
	>>> y_true = [3, -0.5, 2, 7]
	>>> y_pred = [2.5, 0.0, 2, 8]
	>>> d2_absolute_error_score(y_true, y_pred)
	np.float64(0.764...)
	>>> y_true = [[0.5, 1], [-1, 1], [7, -6]]
	>>> y_pred = [[0, 2], [-1, 2], [8, -5]]
	>>> d2_absolute_error_score(y_true, y_pred, multioutput='uniform_average')
	np.float64(0.691...)
	>>> d2_absolute_error_score(y_true, y_pred, multioutput='raw_values')
	array([0.8125 , 0.57142857])
	>>> y_true = [1, 2, 3]
	>>> y_pred = [1, 2, 3]
	>>> d2_absolute_error_score(y_true, y_pred)
	np.float64(1.0)
	>>> y_true = [1, 2, 3]
	>>> y_pred = [2, 2, 2]
	>>> d2_absolute_error_score(y_true, y_pred)
	np.float64(0.0)
	>>> y_true = [1, 2, 3]
	>>> y_pred = [3, 2, 1]
	>>> d2_absolute_error_score(y_true, y_pred)
	np.float64(-1.0)
	"""
	return d2_pinball_score(
	y_true, y_pred, sample_weight=sample_weight, alpha=0.5, multioutput=multioutput
	)