Action Integrals and discrete series

Abstract

Let G be a complex semisimple Lie group and G R a real form that contains a compact Cartan subgroup T R. Let π be a discrete series representation of G R. We present geometric interpretations in terms of concepts associated with the manifold M:=G R/T R of the constant π(g), for g∈ Z(G R). For some relevant particular cases, we prove that this constant is the action integral around a loop of Hamiltonian diffeomorphims of M. As a consequence of these interpretations, we deduce lower bounds for the cardinal of the fundamental group of some subgroups of Diff(M). We also geometrically interpret the values of the infinitesimal character of the differential representation of π.