A sufficient condition for a number to be the order of a nonsingular derivation of a Lie algebra

Abstract

A study of the set Np of positive integers which occur as orders of nonsingular derivations of finite-dimensional non-nilpotent Lie algebras of characteristic p>0 was initiated by Shalev and continued by the present author. The main goal of this paper is to show the abundance of elements of Np. Our main result shows that any divisor n of q-1, where q is a power of p, such that n (p-1)1/p (q-1)1-1/(2p), belongs to Np. This extends its special case for p=2 which was proved in a previous paper by a different method.