On diagonalizable operators in Minkowski spaces with the Lipschitz property

Abstract

A real semi-inner-product space is a real vector space equipped with a function [.,.] : × which is linear in its first variable, strictly positive and satisfies the Schwartz inequality. It is well-known that the function ||x|| = [x,x] defines a norm on . and vica versa, for every norm on X there is a semi-inner-product satisfying this equality. A linear operator A on is called adjoint abelian with respect to [.,.], if it satisfies [Ax,y]=[x,Ay] for every x,y ∈ . The aim of this paper is to characterize the diagonalizable adjoint abelian operators in finite dimensional real semi-inner-product spaces satisfying a certain smoothness condition.