Symmetry breaking operators for dual pairs with one member compact

Abstract

We consider a dual pair (G, G'), in the sense of Howe, with G compact acting on L2(Rn), for an appropriate n, via the Weil representation ω. Let G be the preimage of G in the metaplectic group. Given a genuine irreducible unitary representation of G, let ' be the corresponding irreducible unitary representation of G' in the Howe duality. The orthogonal projection onto L2(Rn), the -isotypic component, is the essentially unique symmetry breaking operator in HomGG'(Hω∞, H∞ H'∞). We study this operator by computing its Weyl symbol. Our results allow us to recover the known list of highest weights of irreducible representations of G occurring in Howe's correspondence when the rank of G is strictly bigger than the rank of G'. They also allow us to compute the wavefront set of ' by elementary means.