Solutions of the sl2 qKZ equations modulo an integer

Abstract

We study the qKZ difference equations with values in the n-th tensor power of the vector sl2 representation V, variables z1,…,zn and integer step . For any integer N relatively prime to the step , we construct a family of polynomials fr(z) in variables z1,…,zn with values in V n such that the coordinates of these polynomials with respect to the standard basis of V n are polynomials with integer coefficients. We show that the polynomials fr(z) satisfy the qKZ equations modulo N. Polynomials fr(z) are modulo N analogs of the hypergeometric solutions of the / equations given in the form of multidimensional Barnes integrals.