On the number of simple modules of Iwahori--Hecke algebras of finite Weyl groups
Abstract
Let Hk(W,q) be the Iwahori--Hecke algebra associated with a finite Weyl group W, where k is a field and 0 ≠ q ∈ k. Assume that the characteristic of k is not ``bad'' for W and let e be the smallest i ≥ 2 such that 1+q+q2+... +qi-1=0. We show that the number of simple Hk(H,q)-modules is ``generic'', i.e., it only depends on e. The proof uses some computations in the CHEVIE package of GAP and known results due to Dipper--James, Ariki--Mathas, Rouquier and the author.
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