Howe type duality for metaplectic group acting on symplectic spinor valued forms

Abstract

Let λ: G G be the non-trivial double covering of the symplectic group G=Sp(V,ω) of the symplectic vector space (V,ω) by the metaplectic group G=Mp(V,ω). In this case, λ is also a representation of G on the vector space V and thus, it gives rise to the representation of G on the space of exterior forms V* by taking wedge products. Let S be the minimal globalization of the Harish-Chandra module of the complex Segal-Shale-Weil representation of the metaplectic group G. We prove that the associative commutant algebra EndG(V* S) of the metaplectic group G acting on the S-valued exterior forms is generated by certain representation of the super ortho-symplectic Lie algebra osp(1|2) and two distinguished operators. This establishes a Howe type duality between the metaplectic group and the super Lie algebra osp(1|2). Also the space V* S is decomposed wr. to the joint action of Mp(V,ω) and osp(1|2).