Higher Rank Askey-Wilson Algebras as Skein Algebras

Abstract

In this paper we give a topological interpretation and diagrammatic calculus for the rank (n-2) Askey-Wilson algebra by proving there is an explicit isomorphism with the Kauffman bracket skein algebra of the (n+1)-punctured sphere. To do this we consider the Askey-Wilson algebra in the braided tensor product of n copies of either the quantum group Uq(sl2) or the reflection equation algebra. We then use the isomorpism of the Kauffman bracket skein algebra of the (n+1)-punctured sphere with the Uq(sl2) invariants of the Aleeksev moduli algebra to complete the correspondence. We also find the graded vector space dimension of the Uq(sl2) invariants of the Aleeksev moduli algebra and apply this to finding a presentation of the skein algebra of the five-punctured sphere and hence also find a presentation for the rank 2 Askey-Wilson algebra.

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