Characterizations of Operator Monotonicity via Operator Means and Applications to Operator Inequalities

Abstract

We prove that a continuous function f:(0,∞) (0,∞) is operator monotone increasing if and only if f(A \: !t \: B) ≤s f(A) \: !t \: f(B) for any positive operators A,B and scalar t ∈ [0,1]. Here, !t denotes the t-weighted harmonic mean. As a counterpart, f is operator monotone decreasing if and only if the reverse of preceding inequality holds. Moreover, we obtain many characterizations of operator-monotone increasingness/decreasingness in terms of operator means. These characterizations lead to many operator inequalities involving means.