Cholesky decomposition error when matrix is regularized.

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Jorey
Jorey on 3 Jan 2017
Commented: Jorey on 4 Jan 2017
I want to perform cholesky facterization to a covariance matrix using chol. As my data matrix has more columns than rows, thus the covariance matrix should be probably positive semi-definite. I added a regularized term to the diagonal of covariance matrix to make sure that it is positive definite, which should be safely facterized by chol. However, the error "Matrix must be positive definite" still occurs. What's the point if I want to use a regularization parameter to make the covariance matrix suitable for using chol?
My regularization term is 0.01*eye(c), where c is the size of covariance matrix.
Thanks.

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Accepted Answer

Walter Roberson
Walter Roberson on 3 Jan 2017
Your covariance matrix probably is not exactly symmetric. Consider forcing it to be symmetric by using
A = (A+A.')/2;
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Walter Roberson
Walter Roberson on 3 Jan 2017
-min(eig(C), 0) to get to at least 0
However, there might still be round-off problems with this.
Jorey
Jorey on 4 Jan 2017
Thanks, it works if I used 'lambda' as max(abs(eig(C))), i.e., C+max(abs(eig(C)))*eye(c), where C is my covariance matrix and c is the size of C.

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