The Temperley-Lieb Tower and the Weyl Algebra
Abstract
We define a monoidal category W and a closely related 2-category 2Weyl using diagrammatic methods. We show that 2Weyl acts on the category TL :=n TLn-mod of modules over Temperley-Lieb algebras, with its generating 1-morphisms acting by induction and restriction. The Grothendieck groups of W and a third category we define W∞ are closely related to the Weyl algebra. We formulate a sense in which K0( W∞) acts asymptotically on K0(TL).
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