The q-deformed random-to-random family in the Hecke algebra
Abstract
We generalize Reiner--Saliola--Welker's well-known but mysterious family of *k-random-to-random shuffles* from Markov chains on symmetric groups to Markov chains on the Type-A Iwahori--Hecke algebras. We prove that the family of operators pairwise commutes and has eigenvalues that are polynomials in q with non-negative integer coefficients. Our work generalizes work of Reiner--Saliola--Welker and Lafreni\`ere for the symmetric group, and simplifies all known proofs in this case.
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