Periodic cyclic homology of Iwahori-Hecke algebras

Abstract

We determine the periodic cyclic homology of the Iwahori-Hecke algebras q, for q ∈ * not a ``proper root of unity.'' (In this paper, by a proper root of unity we shall mean a root of unity other than 1.) Our method is based on a general result on periodic cyclic homology, which states that a ``weakly spectrum preserving'' morphism of finite type algebras induces an isomorphism in periodic cyclic homology. The concept of a weakly spectrum preserving morphism is defined in this paper, and most of our work is devoted to understanding this class of morphisms. Results of Kazhdan--Lusztig and Lusztig show that, for the indicated values of q, there exists a weakly spectrum preserving morphism φq : q J, to a fixed finite type algebra J. This proves that φq induces an isomorphism in periodic cyclic homology and, in particular, that all algebras q have the same periodic cyclic homology, for the indicated values of q. The periodic cyclic homology groups of the algebra 1 can then be determined directly, using results of Karoubi and Burghelea, because it is the group algebra of an extended affine Weyl group.

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