Convexity for twisted conjugation

Abstract

Let G be a compact, simply connected Lie group. If C1,C2 are two G-conjugacy classes, then the set of elements in G that can be written as products g=g1g2 of elements gi∈ Ci is invariant under conjugation, and its image under the quotient map G G/Ad(G) is a convex polytope inside the Weyl alcove. In this note, we will prove an analogous statement for twisted conjugations relative to group automorphisms. The result will be obtained as a special case of a convexity theorem for group-valued moment maps which are equivariant with respect to the twisted conjugation action.