An Araki-Lieb-Thirring inequality for geometrically concave and geometrically convex functions

Abstract

For positive definite matrices A and B, the Araki-Lieb-Thirring inequality amounts to an eigenvalue log-submajorisation relation for fractional powers λ(At Bt) w() λt(AB), 0<t 1, while for t1, the reversed inequality holds. In this paper I generalise this inequality, replacing the fractional powers xt by a larger class of functions. Namely, a continuous, non-negative, geometrically concave function f with domain (f)=[0,x0) for some positive x0 (possibly infinity) satisfies λ(f(A) f(B)) w() f2(λ1/2(AB)), for all positive semidefinite A and B with spectrum in (f), if and only if 0 xf'(x) f(x) for all x∈(f). The reversed inequality holds for continuous, non-negative, geometrically convex functions if and only if they satisfy xf'(x) f(x) for all x∈(f). As an application I derive a complementary inequality to the Golden-Thompson inequality.