Difference equations for graded characters from quantum cluster algebra

Abstract

We introduce a new set of q-difference operators acting as raising operators on a family of symmetric polynomials which are characters of graded tensor products of current algebra g[u] KR-modules FL for g=Ar. These operators are generalizations of the Kirillov-Noumi kinoum Macdonald raising operators, in the dual q-Whittaker limit t∞. They form a representation of the quantum Q-system of type A qKR. This system is a subalgebra of a quantum cluster algebra, and is also a discrete integrable system whose conserved quantities, analogous to the Casimirs of Uq( slr+1), act as difference operators on the above family of symmetric polynomials. The characters in the special case of products of fundamental modules are class I q-Whittaker functions, or characters of level-1 Demazure modules or Weyl modules. The action of the conserved quantities on these characters gives the difference quantum Toda equations Etingof. We obtain a generalization of the latter for arbitrary tensor products of KR-modules.