On the annihilator ideal in the bt-algebra of tensor space

Abstract

We study the representation theory of the braids and ties algebra, or the bt-algebra, E. Using the cellular basis \m s t \ for E obtained in previous joint work with J. Espinoza we introduce two kinds of permutation modules M(λ) and M() for E. We show that the tensor product module V n for E is a direct sum of M(λ)'s. We introduce the dual cellular basis \n s t \ for E and study its action on M(λ) and M( ) . We show that the annihilator ideal I in E of V n enjoys a nice compatibility property with respect to \n s t \. We finally study the quotient algebra E/ I , showing in particular that it is a simultaneous generalization of H\"arterich's 'generalized Temperley-Lieb algebra' and Juyumaya's 'partition Temperley-Lieb algebra'.