The Jones quotients of the Temperley-Lieb algebras

Abstract

When the parameter q is a root of unity, the Temperley-Lieb algebra TLn(q) is non-semisimple for almost all n. Jones showed that 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. In this work, we study the quotients Qn():=TLn(q)/Rn(q), where |q2|=, which are precisely the algebras generated by Jones' projections. We give the dimensions of their simple modules, as well as (Qn()); en route we give generating functions and recursions for the dimensions of cell modules and associated combinatorics. When the order |q2|=4, we obtain an isomorphism of Qn() with the even part of the Clifford algebra, well known to physicists through the Ising model. When |q2|=5, we obtain a sequence of algebras whose dimensions are the odd-indexed Fibonacci numbers. The general case is described explicitly.