Relative Kazhdan Lusztig isomorphism for GL2n/Sp2n

Abstract

The Kazhdan Lusztig isomorphism, relating the affine Hecke algebra of a p-adic group to the equivariant K theory of the Steinberg variety of its Langlands dual, played a key role in the proof of the Deligne Langlands conjectures concerning the classification of smooth irreducible representations with an Iwahori fixed vector. In this work we state and prove a relative version of the Kazhdan Lusztig isomorphism for the symmetric pair (GL2n,Sp2n). The relative isomorphism is an isomorphism between the module of compactly supported Iwahori invariant functions on X=GL2n/Sp2n and another module over the affine Hecke algebra constructed using equivariant K theory and the relative Langlands duality. We use this isomorphism to give a new proof of a condition on X distinguished representations.