Commuting maps on alternative rings

Abstract

Suppose R is a 2,3-torsion free unital alternative ring having an idempotent element e1 (e2 = 1-e1) which satisfies x R · ei = \0\ → x = 0 (i = 1,2). In this paper, we aim to characterize the commuting maps. Let be a commuting map of R so it is shown that (x) = zx + (x) for all x ∈ R, where z ∈ Z(R) and is an additive map from R into Z(R). As a consequence a characterization of anti-commuting maps is obtained and we provide as an application, a characterization of commuting maps on von Neumann algebras relative alternative C*-algebra with no central summands of type I1.