# Reducing dimensions using eigs or eig

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:

``````A=A-repmat(mean(A,2),1,size(A,2));
[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?

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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

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?

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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