A Tensor Space Representation of the Symplectic Blob Algebra

TL;DR

This paper constructs a new tensor space representation for the symplectic blob algebra, extending diagrammatic algebra representations and providing a framework for algebraic specialization over various fields.

Contribution

It introduces a novel tensor space representation of the symplectic blob algebra inspired by existing Temperley-Lieb and blob algebra representations.

Findings

Representation exists over algebraically closed fields

Framework applies to various specializations of parameters

Extends diagrammatic algebra representations

Abstract

The symplectic blob algebras are a family of finite dimensional noncommutative algebras over $\mathbb{Z}[X_1,X_2,X_3,X_4,X_5,X_6]$ that can be defined in terms of planar diagrams in a way that extends the Temperley-Lieb and (ordinary) blob algebras. In this paper we construct a new "tensor space" representation of the symplectic blob algebra $\mathcal{A} \otimes \sba$ for each $n \in \mathbb{N}$, for $\mathcal{A}$ a particular commutative ring with indeterminates. The form of this representation is motivated by the XXZ representation of the Temperley-Lieb algebra $\TL_n$ \cite{jimbo86} and the related Martin-Woodcock representation of the blob algebra $b_n$ \cite{martinwoodcock2003}. For $k$ an algebraically closed field, and for any $(\delta,\delta_L,\delta_R,\kappa_L,\kappa_R,\kappa) \in k^{6}$, the algebra $\sba$ specialises to a $k$-algebra $\sba(\delta,\delta_L,\delta_R,\kappa_L,\kappa_R,\kappa)$. For any such specialisation, our representation passes to a $\sba(\delta,\delta_L,\delta_R,\kappa_L,\kappa_R,\kappa)$-module $\mathcal{V}(n)$.