Abstract
Umegaki's relative entropyS(ω,ϕ)=TrD ω(logD ω−logD ϕ) (of states ω and ϕ with density operatorsD ω andD ϕ, respectively) is shown to be an asymptotic exponent considered from the quantum hypothesis testing viewpoint. It is also proved that some other versions of the relative entropy give rise to the same asymptotics as Umegaki's one. As a byproduct, the inequality TrA logAB ≧TrA(logA+logB) is obtained for positive definite matricesA andB.
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