Stability of the Hecke algebra of wreath products

Abstract

The Hecke algebras Hn,k of the group pairs (Skn, Sk Sn) can be endowed with a filtration with respect to the orbit structures of the elements of Skn relative to the action of Skn on the set of k-partitions of \1,…,kn\. We prove that the structure constants of the associated filtered algebra Fn,k is independent of n. The stability property enables the construction of a universal algebra F to govern the algebras Fn,k. We also prove that the structure constants of the algebras Hn,k are polynomials in n. For k=2, when the algebras (Fn,2)n∈ N are commutative, these results were obtained by Aker and Can, by Can and Ozden, and by Tout.