Schur--Weyl duality for twin groups
Abstract
The twin group TWn on n strands is the group generated by t1, …, tn-1 with defining relations ti2=1, titj = tjti if |i-j|>1. We find a new instance of semisimple Schur--Weyl duality for tensor powers of a natural n-dimensional reflection representation of TWn, depending on a parameter q. At q=1 the representation coincides with the natural permutation representation of the symmetric group, so the new Schur--Weyl duality may be regarded as a q-analogue of the one motivating the definition of the partition algebra.
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