Tilting Modules for the Symplectic Blob Algebra

Abstract

Let be an algebraically closed field. For n ∈ N and δ, δL, δR, L, R, ∈ , the symplectic blob algebra (δ, δL, δR, L, R, ) is a finite dimensional non-commutative -algebra that may be viewed as an extension of the Temperley-Lieb algebra. In a previous paper, we defined, for any n ∈ N, a tensor space module []V(n). In this paper we generalise an argument used by Martin and Ryom-Hansen in their study of the (ordinary) blob algebra to show that when is quasihereditary the module []V(n) is full-tilting.