Determinant of Fp-hypergeometric solutions under ample reduction

Abstract

We consider the KZ differential equations over C in the case, when the hypergeometric solutions are one-dimensional integrals. We also consider the same differential equations over a finite field Fp. We study the polynomial solutions of these differential equations over Fp, constructed in a previous work joint with V.\,Schechtman and called the Fp-hypergeometric solutions. The dimension of the space of Fp-hypergeometric solutions depends on the prime number p. We say that the KZ equations have ample reduction for a prime p, if the dimension of the space of Fp-hypergeometric solutions is maximal possible, that is, equal to the dimension of the space of solutions of the corresponding KZ equations over C. Under the assumption of ample reduction, we prove a determinant formula for the matrix of coordinates of basis Fp-hypergeometric solutions. The formula is analogous to the corresponding formula for the determinant of the matrix of coordinates of basis complex hypergeometric solutions, in which binomials (zi-zj)Mi+Mj are replaced with (zi-zj)Mi+Mj-p and the Euler gamma function (x) is replaced with a suitable Fp-analog Fp(x) defined on Fp.