A quick (maybe naive) question. Consider the following code, where
Sig is a symmetric PSD matrix.
VectorXf c=Sig.ldlt().vectorD(); int p=Sig.cols(); MatrixXf b=MatrixXf::Identity(p,p); Sig.ldlt().solveInPlace(b);
How many times is the Cholesky factorization of
Sig performed here?
If the answer to the above is more than once, I need both the D vector
and the inverse of
Sig. What's the fastest way (e.g. without redundant
coputations) to get both in eigen?