On the topological generation of exceptional groups by unipotent elements

Abstract

Let G be a simple algebraic group of exceptional type over an algebraically closed field of characteristic p ≥slant 0 which is not algebraic over a finite field. Let C1, …, Ct be non-central conjugacy classes in G. In earlier work with Gerhardt and Guralnick, we proved that if t ≥slant 5 (or t ≥slant 4 if G = G2), then there exist elements xi ∈ Ci such that x1, …, xt is Zariski dense in G. Moreover, this bound on t is best possible. Here we establish a more refined version of this result in the special case where p>0 and the Ci are unipotent classes containing elements of order p. Indeed, in this setting we completely determine the classes C1, …, Ct for t ≥slant 2 such that x1, …, xt is Zariski dense for some xi ∈ Ci.