Invariants and K-spectrums of local theta lifts

Abstract

Let (G,G') be a type I irreducible reductive dual pair in Sp(WR). We assume that (G,G') is in the stable range where G is the smaller member. Let K and K' be maximal compact subgroups of G and G' respectively. Let g = k p and g' = k' p' be the complexified Cartan decompositions of the Lie algebras of G and G' respectively. Let K and K' be the inverse images of K and K' in the metaplectic double cover Sp(WR) of Sp(WR). Let be a genuine irreducible (g,K)-module. Our first main result is that if is unitarizable, then except for one special case, the full local theta lift ' = () is equal to the local theta lift θ(). Thus excluding the special case, the full theta lift ' is an irreducible and unitarizable (g',K')-module. Our second main result is that the associated variety and the associated cycle of ' are the theta lifts of the associated variety and the associated cycle of the contragredient representation * respectively. Finally we obtain some interesting (g,K)-modules whose K-spectrums are isomorphic to the spaces of global sections of some vector bundles on some nilpotent KC-orbits in p*.