Non-stationary difference equation and affine Laumon space III : Generalization to glN

Abstract

In a series of papers we have considered a non-stationary difference equation which was originally discovered for the deformed Virasoro conformal block. The equation involves mass parameters and, when they are tuned appropriately, the equation is regarded as a quantum KZ equation for Uq(A1(1)). We introduce a glN generalization of the non-stationary difference equation. The Hamiltonian is expressed in terms of q-commuting variables and allows both factorized forms and a normal ordered form. By specializing the mass parameters appropriately, the Hamiltonian can be identified with the R-matrix of the symmetric tensor representation of Uq(AN-1(1)), which in turn comes from the 3D (tetrahedron) R-matrix. We conjecture that the affine Laumon partition function of type AN-1(1) gives a solution to our glN non-stationary difference equation. As a check of our conjecture, we work out the four dimensional limit and find that the non-stationary difference equation reduces to the Fuji-Suzuki-Tsuda system.