Congruences for Hasse--Witt matrices and solutions of p-adic KZ equations

Abstract

We prove general Dwork-type congruences for Hasse--Witt matrices attached to tuples of Laurent polynomials. We apply this result to establishing arithmetic and p-adic analytic properties of functions originating from polynomial solutions modulo ps of Knizhnik--Zamolodchikov (KZ) equations, solutions which come as coefficients of master polynomials and whose coefficients are integers. As an application we show that the p-adic KZ connection associated with the family of hyperelliptic curves y2=(t-z1)… (t-z2g+1) has an invariant subbundle of rank g. Notice that the corresponding complex KZ connection has no nontrivial subbundles due to the irreducibility of its monodromy representation.