Crystal of affine sl and Hecke algebras at a primitive 2 root of unity

Abstract

Let ∈N with >2 and I:=Z/2. In this paper we give a new realization of the crystal of affine sl using the modular representation theory of the affine Hecke algebras Hn of type A and their level two cyclotomic quotients with Hecke parameter being a primitive 2 root of unity. We realized the Kashiwara operators for the crystal as the functors of taking socle of certain two-steps restriction and of taking head of certain two-steps induction. For any finite dimensional irreducible Hn-module M, we prove that the irreducible submodules of resHn-2HnM which belong to B(∞) (Definition 6.1) occur with multiplicity two. The main results generalize the earlier work of Grojnowski and Vazirani on the relations between the crystal of affine sl and the affine Hecke algebras of type A at a primitive root of unity.