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For the generalized eigenvalue problem $Ax = \lambda Bx$, the current implementation of Generalized Eigen Solvers seems to require either A or B to be positive definite. Is it possible to support the case when both A and B are symmetric positive semi-definite (but singular) matrices? I've encountered such a situation in a statistical scenario, where both matrices are covariance matrices.
The text was updated successfully, but these errors were encountered:
Hi @yixuan,
For the generalized eigenvalue problem$Ax = \lambda Bx$ , the current implementation of
Generalized Eigen Solversseems to require either A or B to be positive definite. Is it possible to support the case when both A and B are symmetric positive semi-definite (but singular) matrices? I've encountered such a situation in a statistical scenario, where both matrices are covariance matrices.The text was updated successfully, but these errors were encountered: