Fusion and monodromy in the Temperley-Lieb category

Abstract

Graham and Lehrer (1998) introduced a Temperley-Lieb category TL whose objects are the non-negative integers and the morphisms in Hom(n,m) are the link diagrams from n to m nodes. The Temperley-Lieb algebra TLn is identified with Hom(n,n). The category TL is shown to be monoidal. We show that it is also a braided category by constructing explicitly a commutor. A twist is also defined on TL. We introduce a module category ModTL whose objects are functors from TL to Vect C and define on it a fusion bifunctor extending the one introduced by Read and Saleur (2007). We use the natural morphisms constructed for TL to induce the structure of a ribbon category on ModTL(β=-q-q-1), when q is not a root of unity. We discuss how the braiding on TL and integrability of statistical models are related. The extension of these structures to the family of dilute Temperley-Lieb algebras is also discussed.