Vehicle-Anti-Theft-Face-Rec.../venv/Lib/site-packages/sklearn/feature_selection/_mutual_info.py

448 lines
16 KiB
Python

# Author: Nikolay Mayorov <n59_ru@hotmail.com>
# License: 3-clause BSD
import numpy as np
from scipy.sparse import issparse
from scipy.special import digamma
from ..metrics.cluster import mutual_info_score
from ..neighbors import NearestNeighbors
from ..preprocessing import scale
from ..utils import check_random_state
from ..utils.fixes import _astype_copy_false
from ..utils.validation import check_array, check_X_y
from ..utils.validation import _deprecate_positional_args
from ..utils.multiclass import check_classification_targets
def _compute_mi_cc(x, y, n_neighbors):
"""Compute mutual information between two continuous variables.
Parameters
----------
x, y : ndarray, shape (n_samples,)
Samples of two continuous random variables, must have an identical
shape.
n_neighbors : int
Number of nearest neighbors to search for each point, see [1]_.
Returns
-------
mi : float
Estimated mutual information. If it turned out to be negative it is
replace by 0.
Notes
-----
True mutual information can't be negative. If its estimate by a numerical
method is negative, it means (providing the method is adequate) that the
mutual information is close to 0 and replacing it by 0 is a reasonable
strategy.
References
----------
.. [1] A. Kraskov, H. Stogbauer and P. Grassberger, "Estimating mutual
information". Phys. Rev. E 69, 2004.
"""
n_samples = x.size
x = x.reshape((-1, 1))
y = y.reshape((-1, 1))
xy = np.hstack((x, y))
# Here we rely on NearestNeighbors to select the fastest algorithm.
nn = NearestNeighbors(metric='chebyshev', n_neighbors=n_neighbors)
nn.fit(xy)
radius = nn.kneighbors()[0]
radius = np.nextafter(radius[:, -1], 0)
# Algorithm is selected explicitly to allow passing an array as radius
# later (not all algorithms support this).
nn.set_params(algorithm='kd_tree')
nn.fit(x)
ind = nn.radius_neighbors(radius=radius, return_distance=False)
nx = np.array([i.size for i in ind])
nn.fit(y)
ind = nn.radius_neighbors(radius=radius, return_distance=False)
ny = np.array([i.size for i in ind])
mi = (digamma(n_samples) + digamma(n_neighbors) -
np.mean(digamma(nx + 1)) - np.mean(digamma(ny + 1)))
return max(0, mi)
def _compute_mi_cd(c, d, n_neighbors):
"""Compute mutual information between continuous and discrete variables.
Parameters
----------
c : ndarray, shape (n_samples,)
Samples of a continuous random variable.
d : ndarray, shape (n_samples,)
Samples of a discrete random variable.
n_neighbors : int
Number of nearest neighbors to search for each point, see [1]_.
Returns
-------
mi : float
Estimated mutual information. If it turned out to be negative it is
replace by 0.
Notes
-----
True mutual information can't be negative. If its estimate by a numerical
method is negative, it means (providing the method is adequate) that the
mutual information is close to 0 and replacing it by 0 is a reasonable
strategy.
References
----------
.. [1] B. C. Ross "Mutual Information between Discrete and Continuous
Data Sets". PLoS ONE 9(2), 2014.
"""
n_samples = c.shape[0]
c = c.reshape((-1, 1))
radius = np.empty(n_samples)
label_counts = np.empty(n_samples)
k_all = np.empty(n_samples)
nn = NearestNeighbors()
for label in np.unique(d):
mask = d == label
count = np.sum(mask)
if count > 1:
k = min(n_neighbors, count - 1)
nn.set_params(n_neighbors=k)
nn.fit(c[mask])
r = nn.kneighbors()[0]
radius[mask] = np.nextafter(r[:, -1], 0)
k_all[mask] = k
label_counts[mask] = count
# Ignore points with unique labels.
mask = label_counts > 1
n_samples = np.sum(mask)
label_counts = label_counts[mask]
k_all = k_all[mask]
c = c[mask]
radius = radius[mask]
nn.set_params(algorithm='kd_tree')
nn.fit(c)
ind = nn.radius_neighbors(radius=radius, return_distance=False)
m_all = np.array([i.size for i in ind])
mi = (digamma(n_samples) + np.mean(digamma(k_all)) -
np.mean(digamma(label_counts)) -
np.mean(digamma(m_all + 1)))
return max(0, mi)
def _compute_mi(x, y, x_discrete, y_discrete, n_neighbors=3):
"""Compute mutual information between two variables.
This is a simple wrapper which selects a proper function to call based on
whether `x` and `y` are discrete or not.
"""
if x_discrete and y_discrete:
return mutual_info_score(x, y)
elif x_discrete and not y_discrete:
return _compute_mi_cd(y, x, n_neighbors)
elif not x_discrete and y_discrete:
return _compute_mi_cd(x, y, n_neighbors)
else:
return _compute_mi_cc(x, y, n_neighbors)
def _iterate_columns(X, columns=None):
"""Iterate over columns of a matrix.
Parameters
----------
X : ndarray or csc_matrix, shape (n_samples, n_features)
Matrix over which to iterate.
columns : iterable or None, default None
Indices of columns to iterate over. If None, iterate over all columns.
Yields
------
x : ndarray, shape (n_samples,)
Columns of `X` in dense format.
"""
if columns is None:
columns = range(X.shape[1])
if issparse(X):
for i in columns:
x = np.zeros(X.shape[0])
start_ptr, end_ptr = X.indptr[i], X.indptr[i + 1]
x[X.indices[start_ptr:end_ptr]] = X.data[start_ptr:end_ptr]
yield x
else:
for i in columns:
yield X[:, i]
def _estimate_mi(X, y, discrete_features='auto', discrete_target=False,
n_neighbors=3, copy=True, random_state=None):
"""Estimate mutual information between the features and the target.
Parameters
----------
X : array_like or sparse matrix, shape (n_samples, n_features)
Feature matrix.
y : array_like, shape (n_samples,)
Target vector.
discrete_features : {'auto', bool, array_like}, default 'auto'
If bool, then determines whether to consider all features discrete
or continuous. If array, then it should be either a boolean mask
with shape (n_features,) or array with indices of discrete features.
If 'auto', it is assigned to False for dense `X` and to True for
sparse `X`.
discrete_target : bool, default False
Whether to consider `y` as a discrete variable.
n_neighbors : int, default 3
Number of neighbors to use for MI estimation for continuous variables,
see [1]_ and [2]_. Higher values reduce variance of the estimation, but
could introduce a bias.
copy : bool, default True
Whether to make a copy of the given data. If set to False, the initial
data will be overwritten.
random_state : int, RandomState instance or None, optional, default None
Determines random number generation for adding small noise to
continuous variables in order to remove repeated values.
Pass an int for reproducible results across multiple function calls.
See :term:`Glossary <random_state>`.
Returns
-------
mi : ndarray, shape (n_features,)
Estimated mutual information between each feature and the target.
A negative value will be replaced by 0.
References
----------
.. [1] A. Kraskov, H. Stogbauer and P. Grassberger, "Estimating mutual
information". Phys. Rev. E 69, 2004.
.. [2] B. C. Ross "Mutual Information between Discrete and Continuous
Data Sets". PLoS ONE 9(2), 2014.
"""
X, y = check_X_y(X, y, accept_sparse='csc', y_numeric=not discrete_target)
n_samples, n_features = X.shape
if isinstance(discrete_features, (str, bool)):
if isinstance(discrete_features, str):
if discrete_features == 'auto':
discrete_features = issparse(X)
else:
raise ValueError("Invalid string value for discrete_features.")
discrete_mask = np.empty(n_features, dtype=bool)
discrete_mask.fill(discrete_features)
else:
discrete_features = check_array(discrete_features, ensure_2d=False)
if discrete_features.dtype != 'bool':
discrete_mask = np.zeros(n_features, dtype=bool)
discrete_mask[discrete_features] = True
else:
discrete_mask = discrete_features
continuous_mask = ~discrete_mask
if np.any(continuous_mask) and issparse(X):
raise ValueError("Sparse matrix `X` can't have continuous features.")
rng = check_random_state(random_state)
if np.any(continuous_mask):
if copy:
X = X.copy()
if not discrete_target:
X[:, continuous_mask] = scale(X[:, continuous_mask],
with_mean=False, copy=False)
# Add small noise to continuous features as advised in Kraskov et. al.
X = X.astype(float, **_astype_copy_false(X))
means = np.maximum(1, np.mean(np.abs(X[:, continuous_mask]), axis=0))
X[:, continuous_mask] += 1e-10 * means * rng.randn(
n_samples, np.sum(continuous_mask))
if not discrete_target:
y = scale(y, with_mean=False)
y += 1e-10 * np.maximum(1, np.mean(np.abs(y))) * rng.randn(n_samples)
mi = [_compute_mi(x, y, discrete_feature, discrete_target, n_neighbors) for
x, discrete_feature in zip(_iterate_columns(X), discrete_mask)]
return np.array(mi)
@_deprecate_positional_args
def mutual_info_regression(X, y, *, discrete_features='auto', n_neighbors=3,
copy=True, random_state=None):
"""Estimate mutual information for a continuous target variable.
Mutual information (MI) [1]_ between two random variables is a non-negative
value, which measures the dependency between the variables. It is equal
to zero if and only if two random variables are independent, and higher
values mean higher dependency.
The function relies on nonparametric methods based on entropy estimation
from k-nearest neighbors distances as described in [2]_ and [3]_. Both
methods are based on the idea originally proposed in [4]_.
It can be used for univariate features selection, read more in the
:ref:`User Guide <univariate_feature_selection>`.
Parameters
----------
X : array_like or sparse matrix, shape (n_samples, n_features)
Feature matrix.
y : array_like, shape (n_samples,)
Target vector.
discrete_features : {'auto', bool, array_like}, default 'auto'
If bool, then determines whether to consider all features discrete
or continuous. If array, then it should be either a boolean mask
with shape (n_features,) or array with indices of discrete features.
If 'auto', it is assigned to False for dense `X` and to True for
sparse `X`.
n_neighbors : int, default 3
Number of neighbors to use for MI estimation for continuous variables,
see [2]_ and [3]_. Higher values reduce variance of the estimation, but
could introduce a bias.
copy : bool, default True
Whether to make a copy of the given data. If set to False, the initial
data will be overwritten.
random_state : int, RandomState instance or None, optional, default None
Determines random number generation for adding small noise to
continuous variables in order to remove repeated values.
Pass an int for reproducible results across multiple function calls.
See :term:`Glossary <random_state>`.
Returns
-------
mi : ndarray, shape (n_features,)
Estimated mutual information between each feature and the target.
Notes
-----
1. The term "discrete features" is used instead of naming them
"categorical", because it describes the essence more accurately.
For example, pixel intensities of an image are discrete features
(but hardly categorical) and you will get better results if mark them
as such. Also note, that treating a continuous variable as discrete and
vice versa will usually give incorrect results, so be attentive about that.
2. True mutual information can't be negative. If its estimate turns out
to be negative, it is replaced by zero.
References
----------
.. [1] `Mutual Information <https://en.wikipedia.org/wiki/Mutual_information>`_
on Wikipedia.
.. [2] A. Kraskov, H. Stogbauer and P. Grassberger, "Estimating mutual
information". Phys. Rev. E 69, 2004.
.. [3] B. C. Ross "Mutual Information between Discrete and Continuous
Data Sets". PLoS ONE 9(2), 2014.
.. [4] L. F. Kozachenko, N. N. Leonenko, "Sample Estimate of the Entropy
of a Random Vector", Probl. Peredachi Inf., 23:2 (1987), 9-16
"""
return _estimate_mi(X, y, discrete_features, False, n_neighbors,
copy, random_state)
@_deprecate_positional_args
def mutual_info_classif(X, y, *, discrete_features='auto', n_neighbors=3,
copy=True, random_state=None):
"""Estimate mutual information for a discrete target variable.
Mutual information (MI) [1]_ between two random variables is a non-negative
value, which measures the dependency between the variables. It is equal
to zero if and only if two random variables are independent, and higher
values mean higher dependency.
The function relies on nonparametric methods based on entropy estimation
from k-nearest neighbors distances as described in [2]_ and [3]_. Both
methods are based on the idea originally proposed in [4]_.
It can be used for univariate features selection, read more in the
:ref:`User Guide <univariate_feature_selection>`.
Parameters
----------
X : array_like or sparse matrix, shape (n_samples, n_features)
Feature matrix.
y : array_like, shape (n_samples,)
Target vector.
discrete_features : {'auto', bool, array_like}, default 'auto'
If bool, then determines whether to consider all features discrete
or continuous. If array, then it should be either a boolean mask
with shape (n_features,) or array with indices of discrete features.
If 'auto', it is assigned to False for dense `X` and to True for
sparse `X`.
n_neighbors : int, default 3
Number of neighbors to use for MI estimation for continuous variables,
see [2]_ and [3]_. Higher values reduce variance of the estimation, but
could introduce a bias.
copy : bool, default True
Whether to make a copy of the given data. If set to False, the initial
data will be overwritten.
random_state : int, RandomState instance or None, optional, default None
Determines random number generation for adding small noise to
continuous variables in order to remove repeated values.
Pass an int for reproducible results across multiple function calls.
See :term:`Glossary <random_state>`.
Returns
-------
mi : ndarray, shape (n_features,)
Estimated mutual information between each feature and the target.
Notes
-----
1. The term "discrete features" is used instead of naming them
"categorical", because it describes the essence more accurately.
For example, pixel intensities of an image are discrete features
(but hardly categorical) and you will get better results if mark them
as such. Also note, that treating a continuous variable as discrete and
vice versa will usually give incorrect results, so be attentive about that.
2. True mutual information can't be negative. If its estimate turns out
to be negative, it is replaced by zero.
References
----------
.. [1] `Mutual Information <https://en.wikipedia.org/wiki/Mutual_information>`_
on Wikipedia.
.. [2] A. Kraskov, H. Stogbauer and P. Grassberger, "Estimating mutual
information". Phys. Rev. E 69, 2004.
.. [3] B. C. Ross "Mutual Information between Discrete and Continuous
Data Sets". PLoS ONE 9(2), 2014.
.. [4] L. F. Kozachenko, N. N. Leonenko, "Sample Estimate of the Entropy
of a Random Vector:, Probl. Peredachi Inf., 23:2 (1987), 9-16
"""
check_classification_targets(y)
return _estimate_mi(X, y, discrete_features, True, n_neighbors,
copy, random_state)