A Characterisation of Anti-Lowner Functions

Abstract

According to a celebrated result by L\"owner, a real-valued function f is operator monotone if and only if its L\"owner matrix, which is the matrix of divided differences Lf=(f(xi)-f(xj)xi-xj)i,j=1N, is positive semidefinite for every integer N>0 and any choice of x1,x2,...,xN. In this paper we answer a question of R. Bhatia, who asked for a characterisation of real-valued functions g defined on (0,+∞) for which the matrix of divided sums Kg=(g(xi)+g(xj)xi+xj)i,j=1N, which we call its anti-L\"owner matrix, is positive semidefinite for every integer N>0 and any choice of x1,x2,...,xN∈(0,+∞). Such functions, which we call anti-L\"owner functions, have applications in the theory of Lyapunov-type equations.