# Left eigenvectors not giving correct (markov) stationary probability in scipy

Given the following Markov Matrix:

import numpy, scipy.linalg
A = numpy.array([[0.9, 0.1],[0.15, 0.85]])


The stationary probability exists and is equal to [.6, .4]. This is easy to verify by taking a large power of the matrix:

B = A.copy()
for _ in xrange(10): B = numpy.dot(B,B)


Here B[0] = [0.6, 0.4]. So far, so good. According to wikipedia:

A stationary probability vector is defined as a vector that does not change under application of the transition matrix; that is, it is defined as a left eigenvector of the probability matrix, associated with eigenvalue 1:

So I should be able to calculate the left eigenvector of A with eigenvalue of 1, and this should also give me the stationary probability. Scipy's implementation of eig has a left keyword:

scipy.linalg.eig(A,left=True,right=False)


Gives:

(array([ 1.00+0.j,  0.75+0.j]), array([[ 0.83205029, -0.70710678],
[ 0.5547002 ,  0.70710678]]))


Which says that the dominant left eigenvector is: [0.83205029, 0.5547002]. Am I reading this incorrectly? How do I get the [0.6, 0.4] using the eigenvalue decomposition?

-

The [0.83205029, 0.5547002] is just [0.6, 0.4] multiplied by ~1.39.

Although from "physical" point of view you need eigenvector with sum of its components equal 1, scaling eigenvector by some factor does not change it's "eigenness":

If , then obviously

So, to get [0.6, 0.4] you should do:

>>> v = scipy.linalg.eig(A,left=True,right=False)[1][:,0]
>>> v
array([ 0.83205029,  0.5547002 ])
>>> v / sum(v)
array([ 0.6,  0.4])

-
Oh, of course. R(ing)TFM shows that eig returns the vectors normalized. In my head, I was expecting a normalized probability distribution (L1 norm) while scipy gave the more obvious sqrt of the sum of squares (L2 norm). In hindsight, I should have noticed that the ratio of the two components were the same in both cases. Thanks! –  Hooked May 8 '12 at 20:27