I need to show that a complicated $n \times n$ Hermitian matrix is positive semidefinite. I'm wondering if there are simple sufficient conditions that can be used to show this. For instance, if a matrix with positive diagonal is diagonally dominant, then it is positive semidefinite. Other conditions like this would be helpful.
2026-03-28 17:05:22.1774717522
Simple sufficient conditions for matrix positive semidefiniteness?
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