Around Operator Monotone Functions
Abstract
We show that the symmetrized product AB+BA of two positive operators A and B is positive if and only if f(A+B)≤ f(A)+f(B) for all non-negative operator monotone functions f on [0,∞) and deduce an operator inequality. We also give a necessary and sufficient condition for that the composition f g of an operator convex function f on [0,∞) and a non-negative operator monotone function g on an interval (a,b) is operator monotone and give some applications.
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