Log-majorizations between quasi-geometric type means for matrices

Abstract

In this paper, for α∈(0,∞)\1\, p>0 and positive semidefinite matrices A and B, we consider the quasi-extension Mα,p(A,B):=Mα(Ap,Bp)1/p of several α-weighted geometric type matrix means Mα(A,B) such as the α-weighted geometric mean in Kubo--Ando's sense, the R\'enyi mean, etc. The log-majorization Mα,p(A,B)Nα,q(A,B) is examined for pairs (M,N) of those α-weighted geometric type means. The joint concavity/convexity of the trace functions Tr\,Mα,p is also discussed based on theory of quantum divergences.

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