Corwin-Greenleaf multiplicity function for compact extensions of the Heisenberg group

Abstract

Let Hn be the (2n+1)-dimensional Heisenberg group and K a closed subgroup of U(n) acting on Hn by automorphisms such that (K,Hn) is a Gelfand pair. Let G=Kn be the semidirect product of K and Hn. Let g⊃k be the respective Lie algebras of G and K, and pr: g*k* the natural projection. For coadjoint orbits OG⊂g* and OK⊂k*, we denote by n(OG,OK) the number of K-orbits in OG pr-1(OK), which is called the Corwin-Greenleaf multiplicity function. In this paper, we give two sufficient conditions on OG in order that n(OG,OK)≤ 1\:\:for any K-coadjoint orbit\:\:OK⊂k*. For K=U(n), assuming furthermore that OG and OK are admissible and denoting respectively by π and τ their corresponding irreducible unitary representations, we also discuss the relationship between n(OG,OK) and the multiplicity m(π,τ) of τ in the restriction of π to K. Especially, we study in Theorem 4 the case where n(OG,OK)≠ m(π,τ). This inequality is interesting because we expect the equality as the naming of the Corwin-Greenleaf multiplicity function suggests.