Applications of amenable semigroups in operator theory

Abstract

The paper deals with continuous homomorphisms S s Ts ∈ L(E) of amenable semigroups S into the algebra L(E) of all bounded linear operators on a Banach space E. For a closed linear subspace F of E, sufficient conditions are given under which there exists a projection P ∈ L(E) onto F that commutes with all Ts. And when E is a Hilbert space, sufficient conditions are given for the existence of an invertible operator R ∈ L(E) such that all R Ts R-1 are isometries. Also certain results on extending intertwining operators, renorming as well as on operators on hereditarily indecomposable Banach spaces are offered.