Equivariant homology of the symplectic affine Grassmannian and dual affine Schur P-functions

Abstract

We study the torus-equivariant homology H*T(GrG) of the affine Grassmannian GrG, where G=Sp2n(C) is the symplectic group. This homology admits a natural ring structure and a Schubert basis, giving rise to a well-defined Schubert calculus. We realize H*T(GrG) in terms of symmetric functions. Our first main result introduces a new family of symmetric functions, called the dual affine Schur P-functions, which represent the Schubert classes. These functions are defined through the action of the affine nil-Hecke algebra, and specialize, in the stable limit as n ∞, to the dual factorial P-functions of Nakagawa and Naruse. Our second main result gives a precise comparison between this symmetric function model and the geometric construction of H*T (GrG) due to Ginzburg and Peterson, which identifies it with a coordinate ring of a centralizer family in the Langlands dual group.

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