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I have a square n*n matrix S that has to be decomposed into a product of two matrices - A1 and A2, where A2 is transposed matrix to A1 (A2=A1^T) , so A1 * A2 = S. Are there any algorithms to do such operation effectively? C#/C++ solution would be nice.

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This is probably part of a larger algorithm, few do linear algebra for fun :) If you want to include the case where S is not symmetric then you should also add the bigger problem. Otherwise, add a check for symmetry at the beginning of your algorithm, it will save a lot of calculations. –  Andrei Jul 21 '10 at 18:07
    
I'm doing some statistics research and at some point find a covariance matrix, with which i must perform such manipulations. Actually, it has to be symmetric, but at this moment it is not (despite the fact all formulas are correct)... It seems like i need to dig deeper into the code before manipulation with matrices. Anyway thanks for proposed approach, this might be it. –  Singularity Jul 21 '10 at 18:28
    
As I understand it, covariance matrices must be symmetric, within the limits of machine precision and accumulated error. If you are getting a covariance matrix that is obviously asymmetric, something is probably fundamentally wrong with your code. –  John R. Strohm Jul 21 '10 at 18:44
    
For sequence X={x1,x2,...xn}; xmean=(x1+...+xn)/n i use formula Sigma(i,j) = i==j ? (1/(n-1)) * pow(xi-xmean,2) : (1/(n-1)) * (xi-xmean)*(xj-xmean), is that right? Sigma(i,j) - covariance between xi and xj, Sigma(i,j)(i=j) = dispersion of xi (diagonal elements of matrix)... –  Singularity Jul 22 '10 at 7:02
    
one more link for you : mathworld.wolfram.com/CovarianceMatrix.html .It looks like you don't need the 1/(n-1) factor, but I'm no expert. Also, both this and your formula should give a symmetric matrix, if it doesn't then check your implementation again. –  Andrei Jul 22 '10 at 18:46

3 Answers 3

As Andrei suggested, it seems you are trying to do Cholesky Decomposition.

There is provided C++ code in polish wiki site for it.

There is also separate subsection in "Numerical recipes in C" (2.9 Cholesky decomposition, can be found here: http://www.nrbook.com/a/bookcpdf/c2-9.pdf )

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In that case you probably want http://en.wikipedia.org/wiki/Cholesky_decomposition

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+1: I was about to add the same link for the new version of the question. –  Aryabhatta Jul 21 '10 at 17:42
    
What if S is not symmetric? –  Singularity Jul 21 '10 at 17:51
    
@Singularity: Use (AB)^T = B^T.A^T and see that if such a decomposition is possible then S = S^T. –  Aryabhatta Jul 21 '10 at 17:57
    
Why -1 for this? –  Aryabhatta Jul 22 '10 at 14:40

I'm not quite sure what you want to do but

here is the GSL lib that might help

14 Linear Algebra

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