Products of Geck-Rouquier conjugacy classes and the Hecke algebra of composed permutations
Abstract
We show the q-analog of a well-known result of Farahat and Higman: in the center of the Iwahori-Hecke algebra Hn,q, if (aλμ(n,q)) is the set of structure constants involved in the product of two Geck-Rouquier conjugacy classes λ,n and μ,n, then each coefficient aλμ(n,q) depends on n and q in a polynomial way. Our proof relies on the construction of a projective limit of the Hecke algebras; this projective limit is inspired by the Ivanov-Kerov algebra of partial permutations.
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