Some inequalities for operator (p,h)-convex functions

Abstract

Let p be a positive number and h a function on R+ satisfying h(xy) h(x) h(y) for any x, y ∈ R+. A non-negative continuous function f on K (⊂ R+) is said to be operator (p,h)-convex if equation*def f ([α Ap + (1-α)Bp]1/p) ≤ h(α)f(A) +h(1-α)f(B) equation* holds for all positive semidefinite matrices A, B of order n with spectra in K, and for any α ∈ (0,1). In this paper, we study properties of operator (p,h)-convex functions and prove the Jensen, Hansen-Pedersen type inequalities for them. We also give some equivalent conditions for a function to become an operator (p,h)-convex. In applications, we obtain Choi-Davis-Jensen type inequality for operator (p,h)-convex functions and a relation between operator (p,h)-convex functions with operator monotone functions.