Iterated torus knots and double affine Hecke algebras

Abstract

We give a topological realization of the (spherical) double affine Hecke algebra SHq,t of type A1, and we use this to construct a module over SHq,t for any knot K ⊂ S3. As an application, we give a purely topological interpretation of Cherednik's 2-variable polynomials Pn(r,s; q,t) of type A1 from [Che13] (where r,s ∈ Z are relatively prime), and we give a new proof that these specialize to the colored Jones polynomials of the r,s torus knot. We then generalize Cherednik's construction (for sl2) to all iterated cables of the unknot and prove the corresponding specialization property. Finally, in the appendix we compare our polynomials associated to iterated torus knots to the ones recently defined in [CD14], in the specialization t=-q2.