A counterexample to a conjugacy conjecture of Steinberg

Abstract

Let G be a semisimple algebraic group over an algebraically closed field of characteristic p ≥ 0. At the 1966 International Congress of Mathematicians in Moscow, Robert Steinberg conjectured that two elements a, a' ∈ G are conjugate in G if and only if f(a) and f(a') are conjugate in GL(V) for every rational irreducible representation f: G → GL(V). Steinberg showed that the conjecture holds if a and a' are semisimple, and also proved the conjecture when p = 0. In this paper, we give a counterexample to Steinberg's conjecture. Specifically, we show that when p = 2 and G is simple of type C5, there exist two non-conjugate unipotent elements u, u' ∈ G such that f(u) and f(u') are conjugate in GL(V) for every rational irreducible representation f: G → GL(V).