Functional identities involving inverses on Banach algebras

Abstract

The purpose of this paper is to characterize several classes of functional identities involving inverses with related mappings from a unital Banach algebra A over the complex field into a unital A-bimodule M. Let N be a fixed invertible element in A, M be a fixed element in M, and n be a positive integer. We investigate the forms of additive mappings f, g from A into M satisfying one of the following identities: equation* aligned &f(A)A- Ag(A) = 0\\ &f(A)+ g(B) A= M\\ &f(A)+Ang(A-1)=0\\ &f(A)+Ang(B)=M aligned aligned &for each invertible element~A∈A; \\ &whenever~ A,B∈A~with~AB=N;\\ &for each invertible element~A∈A; \\ &whenever~ A,B∈A~with~AB=N, aligned equation* where is either the Jordan product A B = AB+BA or the Lie product A B = AB-BA.