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Given a matrix A with dimension m x n and the entries in the matrix lies [0,1]
For example

A = [0.5 0   0  0.5 0
     0   0.5 0  0   0.5
     1   0   0  0   0]

I would like to calculate sum(sum(a_ij log(a_ij))), where a_ij is the i th row and j th col entry in the matrix A. Since there exist an 0 entry in the matrix, i always get NAN as a result.

How do i consider only non-zero entries to calculate sum(sum(a_ij log(a_ij))) [entropy of the matrix].

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I came up with the following matlab code sum(A(A~=0).*log(A(A~=0))) – Learner Jul 10 '11 at 8:41
up vote 4 down vote accepted

To consider only specific elements of a matrix you can use logical indexing. For example if you only want to select non-zero entries of A you can use A(A~=0). So for your problem the solution can be written:


EDIT: wow that is some kind of coincidence, I've just seen your comment after posting this. Well, glad you've worked it out yourself.

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Yeah, i tried it few more times after posting the question. Thanks for your effort. – Learner Jul 10 '11 at 8:48
Good answer, but depending on the size of A, it might be better to store the expression A~=0 in a temporary variable to avoid calculating it twice. – Hosam Aly Jul 10 '11 at 8:55

Another possibility:

x = A(:);
E = x' * log(x + (x==0))
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If it is a very large array:


which should be faster than indexing.

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