Positive definite matrices with Hermitian blocks and their partial traces

Abstract

Let H be a positive semi-definite matrix partitioned in β× β Hermitian blocks, H=[As,t], 1 s,t, β. Then, for all symmetric norms, equation* \| H \| \| Σs=1β As,s \|. equation* The proof uses a nice decomposition for positive matrices and unitary congruences with the generators of a Clifford algebra. A few corollaries are given, in particular the partial trace operation increases norms of separable states on a real Hilbert space, leading to a conjecture for usual complex Hilbert spaces.