Lie maps on alternative rings preserving idempotents

Abstract

Let and ' unital 2,3-torsion free alternative rings and : → ' be a surjective Lie multiplicative map that preserves idempotents. Assume that has a nontrivial idempotents. Under certain assumptions on , we prove that is of the form + τ, where is either an isomorphism or the negative of an anti-isomorphism of onto ' and τ is an additive mapping of into the centre of ' which maps commutators into zero.