On the integrality of the Taylor coefficients of mirror maps

Abstract

We show that the Taylor coefficients of the series q(z)=z( G(z)/ F(z)) are integers, where F(z) and G(z)+(z) F(z) are specific solutions of certain hypergeometric differential equations with maximal unipotent monodromy at z=0. We also address the question of finding the largest integer u such that the Taylor coefficients of (z -1 q(z))1/u are still integers. As consequences, we are able to prove numerous integrality results for the Taylor coefficients of mirror maps of Calabi-Yau complete intersections in weighted projective spaces, which improve and refine previous results by Lian and Yau, and by Zudilin. In particular, we prove the general ``integrality'' conjecture of Zudilin about these mirror maps. A further outcome of the present study is the determination of the Dwork-Kontsevich sequence (uN)N1, where uN is the largest integer such that q(z)1/uN is a series with integer coefficients, where q(z)=(F(z)/G(z)), F(z)=Σm=0 ∞ (Nm)! zm/m!N and G(z)=Σm=1 ∞ (HNm-Hm)(Nm)! zm/m!N, with Hn denoting the n-th harmonic number, conditional on the conjecture that there are no prime number p and integer N such that the p-adic valuation of HN-1 is strictly greater than 3.