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How do I find out eigenvectors corresponding to a particular eigenvalue?

I have a stochastic matrix(P), one of the eigenvalues of which is 1. I need to find the eigenvector corresponding to the eigenvalue 1.

The scipy function scipy.linalg.eig returns the array of eigenvalues and eigenvectors.

D, V = scipy.linalg.eig(P)

Here D(array of values) and V(array of vectors) are both vectors.

One way is to do a search in D and extract the corresponding eigenvector in V. Is there an easier way?

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2 Answers 2

up vote 1 down vote accepted

If you are looking for one eigenvector corresponding to one eigenvalue, it could be much more efficient to use the scipy.sparse.linalg implementation of the eig function. It allows to look for a fixed number of eigenvectors and to shift the search around a specific value. You could do for instance :

values, vectors = scipy.sparse.linalg.eigs(P, k=1, sigma=1)
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Does it return the left eigenvalue of P? –  AIB Aug 14 '12 at 15:47
    
I think you meant eigs not eig. I tried with scipy.sparse.linalg.eigs(P, k=1, sigma=1) but an exception is raised - raise NotImplementedError("shifted eigenproblem not supported yet") –  AIB Aug 14 '12 at 15:52
    
Fixed eig -> eigs. Shifted eigenproblem is implemented in the version I use : scipy 0.10.1 –  Nicolas Barbey Aug 16 '12 at 8:26
    
accepting as answer.. I will upgrade the scipy version and try... –  AIB Aug 16 '12 at 17:51
import numpy as np
import numpy.linalg as linalg


P = np.array([[2, 0, 0], [0, 1, 0], [0, 0, 3]])

D, V = linalg.eig(P)
print(D)
# [ 2.  1.  3.]

The eigenvectors are columns of V:

V = V.T

for val, vec in zip(D, V):
    assert np.allclose(np.dot(P, vec), val*vec)

So the eigenvector corresponding to eigenvalue 1.0 is

def near(a, b, rtol = 1e-5, atol = 1e-8):
    return np.abs(a-b)<(atol+rtol*np.abs(b))

print(V[near(D, 1.0)])
# [[ 0.  1.  0.]]

Since there can be more than one eigenvector with the same eigenvalue, V[near(D, 1.0)] returns a 2-dimensional array -- each row of the array is an eigenvector with an eigenvalue of 1.0.

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