An exotic Deligne-Langlands correspondence for symplectic groups

Abstract

Let G be a complex symplectic group. We introduce a G x (C x) l + 1-variety Nl, which we call the l-exotic nilpotent cone. Then, we realize the Hecke algebra H of type Cn (1) with three parameters via equivariant algebraic K-theory in terms of the geometry of N2. This enables us to establish a Deligne-Langlands type classification of "non-critical" simple H-modules. As applications, we present a character formula and multiplicity formulas of H-modules.

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