Stated Skeins and DAHAs

Abstract

Skein algebras of surfaces quantize character varieties of topological surfaces, and in low genus, these quantizations are often related to algebras arising in representation theory. For example, Terwilliger defined a universal SL2 spherical double affine Hecke algebra A; a combination of results in the literature shows A is isomorphic to the SL2 skein algebra of the punctured torus. Stated skein algebras are a generalization which quantize decorated character varieties. In this paper, we used stated skein algebras to construct a new embedding of A into a rank 6 quantum torus, and we show that each marked 3-manifold with a torus boundary produces a module over A. We also determine a generating set for the stated skein algebra of T2 D2, and we find many relations; however, finding a complete list of relations is still an open problem.

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