Hyperelliptic integrals modulo $p$ and Cartier-Manin matrices
Abstract
The hypergeometric solutions of the KZ equations were constructed almost 30 years ago. The polynomial solutions of the KZ equations over the finite field with a prime number of elements were constructed recently. In this paper we consider the example of the KZ equations whose hypergeometric solutions are given by hyperelliptic integrals of genus . It is known that in this case the total -dimensional space of holomorphic solutions is given by the hyperelliptic integrals. We show that the recent construction of the polynomial solutions over the field in this case gives only a -dimensional space of solutions, that is, a "half" of what the complex analytic construction gives. We also show that all the constructed polynomial solutions over the field can be obtained by reduction modulo of a single distinguished hypergeometric solution. The corresponding formulas involve the entries of the Cartier-Manin matrix of the hyperelliptic curve. That situation is analogous to the example of the elliptic integral considered in the classical Y.I. Manin's paper in 1961.
Keywords
Cite
@article{arxiv.1806.03289,
title = {Hyperelliptic integrals modulo $p$ and Cartier-Manin matrices},
author = {Alexander Varchenko},
journal= {arXiv preprint arXiv:1806.03289},
year = {2018}
}
Comments
Latex, 16 pages