Factorial type I KMS states of Lie groups

Abstract

Motivated by the study of KMS conditions for C*- or W*-dynamical systems defined by covariant unitary representations of topological groups, we consider Gibbs states of a finite-dimensional Lie group G and prove that these are precisely the factorial type I KMS states. For an element X∈ L(G) and an irreducible unitary representation of G satisfying tr(ei∂(X))=1, the corresponding Gibbs state is defined as (g)=tr((g)ei∂(X)). We prove that under the mild assumption that has discrete kernel, the condition tr(ei∂(X))<~∞ implies that the generator X is an inner point of the set comp(g) of elliptic elements in g. This allows us to obtain a complete characterization of Lie algebras g, representations with discrete kernel and generators X such that tr(ei∂(X))<∞.