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mutual_info.py
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mutual_info.py
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'''
Non-parametric computation of entropy and mutual-information
Adapted by G Varoquaux for code created by R Brette, itself
from several papers (see in the code).
These computations rely on nearest-neighbor statistics
'''
import numpy as np
from scipy.special import gamma,psi
from scipy import ndimage
from scipy.linalg import det
from numpy import pi
from sklearn.neighbors import NearestNeighbors
__all__=['entropy', 'mutual_information', 'entropy_gaussian']
EPS = np.finfo(float).eps
def nearest_distances(X, k=1):
'''
X = array(N,M)
N = number of points
M = number of dimensions
returns the distance to the kth nearest neighbor for every point in X
'''
knn = NearestNeighbors(n_neighbors=k)
knn.fit(X)
d, _ = knn.kneighbors(X) # the first nearest neighbor is itself
return d[:, -1] # returns the distance to the kth nearest neighbor
def entropy_gaussian(C):
'''
Entropy of a gaussian variable with covariance matrix C
'''
if np.isscalar(C): # C is the variance
return .5*(1 + np.log(2*pi)) + .5*np.log(C)
else:
n = C.shape[0] # dimension
return .5*n*(1 + np.log(2*pi)) + .5*np.log(abs(det(C)))
def entropy(X, k=1):
''' Returns the entropy of the X.
Parameters
===========
X : array-like, shape (n_samples, n_features)
The data the entropy of which is computed
k : int, optional
number of nearest neighbors for density estimation
Notes
======
Kozachenko, L. F. & Leonenko, N. N. 1987 Sample estimate of entropy
of a random vector. Probl. Inf. Transm. 23, 95-101.
See also: Evans, D. 2008 A computationally efficient estimator for
mutual information, Proc. R. Soc. A 464 (2093), 1203-1215.
and:
Kraskov A, Stogbauer H, Grassberger P. (2004). Estimating mutual
information. Phys Rev E 69(6 Pt 2):066138.
'''
# Distance to kth nearest neighbor
r = nearest_distances(X, k) # squared distances
n, d = X.shape
volume_unit_ball = (pi**(.5*d)) / gamma(.5*d + 1)
'''
F. Perez-Cruz, (2008). Estimation of Information Theoretic Measures
for Continuous Random Variables. Advances in Neural Information
Processing Systems 21 (NIPS). Vancouver (Canada), December.
return d*mean(log(r))+log(volume_unit_ball)+log(n-1)-log(k)
'''
return (d*np.mean(np.log(r + np.finfo(X.dtype).eps))
+ np.log(volume_unit_ball) + psi(n) - psi(k))
def mutual_information(variables, k=1):
'''
Returns the mutual information between any number of variables.
Each variable is a matrix X = array(n_samples, n_features)
where
n = number of samples
dx,dy = number of dimensions
Optionally, the following keyword argument can be specified:
k = number of nearest neighbors for density estimation
Example: mutual_information((X, Y)), mutual_information((X, Y, Z), k=5)
'''
if len(variables) < 2:
raise AttributeError(
"Mutual information must involve at least 2 variables")
all_vars = np.hstack(variables)
return (sum([entropy(X, k=k) for X in variables])
- entropy(all_vars, k=k))
def mutual_information_2d(x, y, sigma=1, normalized=False):
"""
Computes (normalized) mutual information between two 1D variate from a
joint histogram.
Parameters
----------
x : 1D array
first variable
y : 1D array
second variable
sigma: float
sigma for Gaussian smoothing of the joint histogram
Returns
-------
nmi: float
the computed similariy measure
"""
bins = (256, 256)
jh = np.histogram2d(x, y, bins=bins)[0]
# smooth the jh with a gaussian filter of given sigma
ndimage.gaussian_filter(jh, sigma=sigma, mode='constant',
output=jh)
# compute marginal histograms
jh = jh + EPS
sh = np.sum(jh)
jh = jh / sh
s1 = np.sum(jh, axis=0).reshape((-1, jh.shape[0]))
s2 = np.sum(jh, axis=1).reshape((jh.shape[1], -1))
# Normalised Mutual Information of:
# Studholme, jhill & jhawkes (1998).
# "A normalized entropy measure of 3-D medical image alignment".
# in Proc. Medical Imaging 1998, vol. 3338, San Diego, CA, pp. 132-143.
if normalized:
mi = ((np.sum(s1 * np.log(s1)) + np.sum(s2 * np.log(s2)))
/ np.sum(jh * np.log(jh))) - 1
else:
mi = ( np.sum(jh * np.log(jh)) - np.sum(s1 * np.log(s1))
- np.sum(s2 * np.log(s2)))
return mi
###############################################################################
# Tests
def test_entropy():
# Testing against correlated Gaussian variables
# (analytical results are known)
# Entropy of a 3-dimensional gaussian variable
rng = np.random.RandomState(0)
n = 50000
d = 3
P = np.array([[1, 0, 0], [0, 1, .5], [0, 0, 1]])
C = np.dot(P, P.T)
Y = rng.randn(d, n)
X = np.dot(P, Y)
H_th = entropy_gaussian(C)
H_est = entropy(X.T, k=5)
# Our estimated entropy should always be less that the actual one
# (entropy estimation undershoots) but not too much
np.testing.assert_array_less(H_est, H_th)
np.testing.assert_array_less(.9*H_th, H_est)
def test_mutual_information():
# Mutual information between two correlated gaussian variables
# Entropy of a 2-dimensional gaussian variable
n = 50000
rng = np.random.RandomState(0)
#P = np.random.randn(2, 2)
P = np.array([[1, 0], [0.5, 1]])
C = np.dot(P, P.T)
U = rng.randn(2, n)
Z = np.dot(P, U).T
X = Z[:, 0]
X = X.reshape(len(X), 1)
Y = Z[:, 1]
Y = Y.reshape(len(Y), 1)
# in bits
MI_est = mutual_information((X, Y), k=5)
MI_th = (entropy_gaussian(C[0, 0])
+ entropy_gaussian(C[1, 1])
- entropy_gaussian(C)
)
# Our estimator should undershoot once again: it will undershoot more
# for the 2D estimation that for the 1D estimation
print MI_est, MI_th
np.testing.assert_array_less(MI_est, MI_th)
np.testing.assert_array_less(MI_th, MI_est + .3)
def test_degenerate():
# Test that our estimators are well-behaved with regards to
# degenerate solutions
rng = np.random.RandomState(0)
x = rng.randn(50000)
X = np.c_[x, x]
assert np.isfinite(entropy(X))
assert np.isfinite(mutual_information((x[:, np.newaxis],
x[:, np.newaxis])))
assert 2.9 < mutual_information_2d(x, x) < 3.1
def test_mutual_information_2d():
# Mutual information between two correlated gaussian variables
# Entropy of a 2-dimensional gaussian variable
n = 50000
rng = np.random.RandomState(0)
#P = np.random.randn(2, 2)
P = np.array([[1, 0], [.9, .1]])
C = np.dot(P, P.T)
U = rng.randn(2, n)
Z = np.dot(P, U).T
X = Z[:, 0]
X = X.reshape(len(X), 1)
Y = Z[:, 1]
Y = Y.reshape(len(Y), 1)
# in bits
MI_est = mutual_information_2d(X.ravel(), Y.ravel())
MI_th = (entropy_gaussian(C[0, 0])
+ entropy_gaussian(C[1, 1])
- entropy_gaussian(C)
)
print MI_est, MI_th
# Our estimator should undershoot once again: it will undershoot more
# for the 2D estimation that for the 1D estimation
np.testing.assert_array_less(MI_est, MI_th)
np.testing.assert_array_less(MI_th, MI_est + .2)
if __name__ == '__main__':
# Run our tests
test_entropy()
test_mutual_information()
test_degenerate()
test_mutual_information_2d()