Kummer congruences arising from the mirror symmetry of an elliptic curve

Abstract

In the genus 1 case, mirror symmetry reduces to the statement that a certain family of generating functions, relating to an elliptic curve, are quasimodular. In their proof of this fact, Kaneko and Zagier used a related family of generating functions An(τ), which they show to be quasimodular. We show that these An's also satisfy Kummer-type congruences. Additionally, we show that for a prime p, the pth power coefficients of An p-adically converge to zero, for specific values of n.