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

Abstract

Let S denote the oscillatory module over the complex symplectic Lie algebra g= sp(VC,ω). Consider the g-module W=(V*)C S of exterior forms with values in the oscillatory module. We prove that the associative algebra Endg(W) is generated by the image of a certain representation of the ortho-symplectic Lie super algebra osp(1|2) and two distinguished projection operators. The space (V*)C S is decomposed with respect to the joint action of g and osp(1|2). This establishes a Howe type duality for sp(VC,ω) acting on W.