Temperley-Lieb at roots of unity, a fusion category and the Jones quotient

Abstract

When the parameter q is a root of unity, the Temperley-Lieb algebra TLn(q) is non-semisimple for almost all n. In this work, using cellular methods, we give explicit generating functions for the dimensions of all the simple TLn(q)-modules. Jones showed that if the order |q2|= there is a canonical symmetric bilinear form on TLn(q), whose radical Rn(q) is generated by a certain idempotent E∈ TL-1(q)⊂eq TLn(q), which is now referred to as the Jones-Wenzl idempotent, for which an explicit formula was subsequently given by Graham and Lehrer. Although the algebras Qn():=TLn(q)/Rn(q), which we refer to as the Jones algebras (or quotients), are not the largest semisimple quotients of the TLn(q), our results include dimension formulae for all the simple Qn()-modules. This work could therefore be thought of as generalising that of Jones et al. on the algebras Qn(). We also treat a fusion category C red introduced by Reshitikhin, Turaev and Andersen, whose objects are the quantum sl2-tilting modules with non-zero quantum dimension, and which has an associative truncated tensor product (the fusion product). We show Qn() is the endomorphism algebra of a certain module in C red and use this fact to recover a dimension formula for Qn(). We also show how to construct a "stable limit" K(Q∞) of the corresponding fusion category of the Qn(), whose structure is determined by the fusion rule of C red, and observe a connection with a fusion category of affine sl2 and the Virosoro algebra.