An invariant subbundle of the KZ connection mod p and reducibility of sl2 Verma modules mod p

Abstract

We consider the KZ differential equations over C in the case, when its multidimensional hypergeometric solutions are one-dimensional integrals. We also consider the same differential equations over a finite field Fp. We study the space of polynomial solutions of these differential equations over Fp, constructed in a previous work by V. Schechtman and the author. The module of these polynomial solutions defines an invariant subbundle of the associated KZ connection modulo p. We describe the algebraic equations for that subbundle and argue that the equations correspond to highest weight vectors of the associated sl2 Verma modules over the field Fp.