Some extensions of the operator entropy type inequalities

Abstract

In this paper, we establish some reverses of the operator entropy inequalities under certain conditions by using the Mond-Pecari\'c method. In particular, we present align* f&[∫T(Asp+1Bs)dμ(s)+t0(I H-∫TAspBsdμ(s))]-γff(t0)(I H-∫TAspBsdμ(s))\\ & γfSpf(A|B)\,, align* where T is a locally compact Hausdorff space and μ is a Radon measure on T, 0<m As ≤ Bs ≤ M As\,\,(s∈ T) for some positive real numbers m, M such that m<1<M, ∫TAs=∫TBs=I H, f: (0,∞) [0,∞) be operator concave, γf=\f(t)μf t+f: m≤ t≤ M,μf=f(M)-f(m)M-m, f=Mf(m)-mf(M)M-m\, t0∈[m,M], p∈[0,1], and Spf(A|B)=∫TAs12(As-12BsAs-12)p f(As-12BsAs-12)As12dμ(s)\,.