Twisted conjugacy in linear algebraic groups

Abstract

Let k be an algebraically closed field, G a linear algebraic group over k and ∈ Aut(G), the group of all algebraic group automorphisms of G. Two elements x, y of G are said to be -twisted conjugate if y=gx(g)-1 for some g∈ G. In this paper we prove that for a connected non-solvable linear algebraic group G over k, the number of its -twisted conjugacy classes is infinite for every ∈ Aut(G).