The length of mixed identities for finite groups

Abstract

We prove that there exists a constant c>0 such that any finite group having no non-trivial mixed identity of length ≤ c is an almost simple group with a simple group of Lie type as its socle. Starting the study of mixed identities for almost simple groups, we obtain results for groups with socle PSLn(q), PSp2m(q), P 2m-1(q), and PSUn(q) for a prime power q. For such groups, we will prove rank-independent bounds for the length of a shortest non-trivial mixed identity, depending only on the field size q.