Jointly convex mappings related to the Lieb's functional and Minkowski type operator inequalities

Abstract

Employing the notion of operator log-convexity, we study joint concavity/ convexity of multivariable operator functions: (A,B) F(A,B)=h[ (f(A))\ σ\ (g(B))], where and are positive linear maps and σ is an operator mean. As applications, we prove jointly concavity/convexity of matrix trace functions \ F(A,B)\. Moreover, considering positive multi-linear mappings in F(A,B), our study of the joint concavity/ convexity of (A1,·s,Ak) h[ (f(A1),·s,f(Ak))] provides some generalizations and complement to results of Ando and Lieb concerning the concavity/ convexity of maps involving tensor product. In addition, we present Minkowski type operator inequalities for a unial positive linear map, which is an operator version of Minkowski type matrix trace inequalities under a more general setting than Carlen and Lieb, Bekjan, and Ando and Hiai.