Iwahori-Hecke algebras acting on tensor space by q-deformed letter permutations and q-partition algebras

Abstract

Let R be a commutative ring with identity and let V be a free R-module of rank n for some n∈N. Fixing an R-basis E of V, the symmetric group Sn acts on V by permuting E and hence on tensor space V r for r∈N via the usual tensor product action turning V and V r into RSn-modules. For units q in R we construct an action of the corresponding Iwahori-Hecke algebra HR,q(Sn) which specializes to the action of RSn, if q is taken to 1. The centralizing algebra of this action is called the q-partition algebra PR,q(n,r). Let R be a field of characteristic not dividing q. We prove, that PR,q(n,r) is isomorphic to the q-partition algebra defined by Halverson and Thiem by different means a few years ago.

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