Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I have a 1024x704x256 image which I have reorganized into a 2D matrix. Each row represents an energy channel and each column represents a pixel. I am performing PCA to reduce the number of bands with the code:

[V, D] = eig(cov(A'));  
Evalues = diag(D);  
pc = V * A;  

where A=mean adjusted 2D data set, V=matrix of eigenvectors, and D=matrix of eigenvalues.

My problem is that the outputs (using either eigs or eig) for V and D are automatically in ascending order. I have not had this issue using these functions before on smaller data sets. I need to know which vector/value pairs correspond to the rows in matrix A for further analysis. Any ideas?

share|improve this question
The purpose of the PCA is to transform the original data to a set of orthogonal components. Thus, you have to loose the correspondence to rows in your original data set. –  Mehrwolf Aug 11 '12 at 23:27

1 Answer 1

The eigenvalue/eigenvector problem can be defined as

A*V = lambda*V

where lambda is scalar (an eigenvalue), and V is a vector (an eigenvector).

As far as I can see, nor the eigenvalues nor the eigenvectors have any specific correspondence to individual rows in the matrix A.

Can you elaborate on why you don't want your eigenvalues/vectors to be ordered?

share|improve this answer
Thank you for responding. I would like to reduce the number of variables from 256 to six or less. When I reduce the number of variables, I am uncertain of which ones I will inevitably be keeping. Perhaps this is not an issue of the eigs function, however I was confused with the ordered output, having received a non-ascending output before. –  katherb Aug 15 '12 at 18:58
Hmmm...If memory serves, efficient eigenvalue/vector-finding algorithms return largest eigenvalue/vector pairs first, so it's entirely unexpected if the output of eig() would not be sorted... –  Rody Oldenhuis Aug 15 '12 at 20:19

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.