On Araki-Type Trace Inequalities
Abstract
In this paper, we prove a trace inequality Tr[ f(A) As Bs ] ≤ Tr[ f(A) (A1/2 B A1/2 )s ] for any positive and monotone increasing function f, s∈[0,1], and positive semi-definite matrices A and B. On the other hand, for s∈[0,1] such that the map x xs g(x) is positive and decreasing, then Tr[ g(A) (A1/2 B A1/2 )s ] ≤ Tr[ g(A) As Bs ].
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