The Drinfeld Center of the Generic Temperley--Lieb Category

Abstract

We show that the Temperley--Lieb category TL(q;C) embeds in an ultraproduct of modular tensor categories when q is not a root of unity. As a result, we show that its Drinfeld center is semisimple and describe its simple objects. The canonical functor TL(q;C) TL(q;C)rev Rep(Z/2Z) Z(TL(q;C)), induced by the braiding and the Z/2Z--grading on the Temperley--Lieb category, is thus shown to be a monoidal equivalence, which becomes a braided equivalence upon twisting the braiding by a certain bicharacter. Along the way, we formalize some general results about ultraproducts of tensor categories and tensor functors, building on earlier works of Crumley, Harman, and Flake--Harman--Laugwitz. We also discuss the center at some exceptional values of q.

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