An Elliptic Generalization of A1 Spherical DAHA at K=2

Abstract

We construct an algebra that is an elliptic generalization of A1 spherical DAHA acting on its finite-dimensional module at t=-q-K/2 with K=2. We prove that PSL(2, Z) acts by automorphisms of the algebra we constructed, and provide an explicit representation of automorphisms and algebra operators alike by 3× 3 matrices of elliptic functions. A relation of this construction to the K-theory character of affine Laumon space is conjectured. We point out two potential applications, respectively to SL(3, Z) symmetry of Felder-Varchenko functions and to new elliptic invariants of torus knots and Seifert manifolds.