Inequalities on the joint and generalized spectral and essential spectral radius of the Hadamard geometric mean of bounded sets of positive kernel operators

Abstract

Let and be bounded sets of positive kernel operators on a Banach function space L. We prove several refinements of the known inequalities ( ( 12 ) ( 12 ) ) ( ) 12 \;\; and\;\; ( ( 12 ) ( 12 ) ) ( ) 12 for the generalized spectral radius and the joint spectral radius , where ( 12 ) ( 12 ) denotes the Hadamard (Schur) geometric mean of the sets and . Furthermore, we prove that analogous inequalities hold also for the generalized essential spectral radius and the joint essential spectral radius in the case when L and its Banach dual L* have order continuous norms.