Analogue of the Cauchy-Schwarz inequality for determinants: a simple proof
Abstract
In this note, we present a simple proof of an analogue of the Cauchy-Schwarz inequality relevant to products of determinants. Specifically, we show that |(A*MB)|2≤ (A*MA)· (B*MB), A,B∈ Cm× n, where M∈Cm× m is hermitian positive definite. Here m and n are arbitrary. In case m≤ n, equality holds trivially. Equality holds when m>n and rank(A)=rank(B)=n if and only if the columns of A and the columns of B span the same subspace of Cm.
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