Reality Properties of Conjugacy Classes in G2

Abstract

Let G be an algebraic group over a field k. We call g∈ G(k) real if g is conjugate to g-1 in G(k). In this paper we study reality for groups of type G2 over fields of characteristic different from 2. Let G be such a group over k. We discuss reality for both semisimple and unipotent elements. We show that a semisimple element in G(k) is real if and only if it is a product of two involutions in G(k). Every unipotent element in G(k) is a product of two involutions in G(k). We discuss reality for G2 over special fields and construct examples to show that reality fails for semisimple elements in G2 over and p. We show that semisimple elements are real for G2 over k with cd(k)≤ 1. We conclude with examples of nonreal elements in G2 over k finite, with characteristic k not 2 or 3, which are not semisimple or unipotent.