Twisted Conjugation on Connected Simple Lie Groups and Twining Characters

Abstract

This article discusses the twisted adjoint action Adg:G→ G, x gx(g-1) given by a Dynkin diagram automorphism ∈Aut(G), where G is compact, connected, simply connected and simple. The first aim is to recover the classification of -twisted conjugacy classes by elementary means, without invoking the non-connected group G. The second objective is to highlight several properties of the so-called twining characters ():G→C, as defined by Fuchs, Schellekens and Schweigert. These class functions generalize the usual characters, and define -twisted versions R()(G) and Rk()(G) (k∈Z>0) of the representation and fusion rings associated to G. In particular, the latter are shown to be isomorphic to the representation and fusion rings of the orbit Lie group G(), a simply connected group obtained from and the root data of G.