The Arithmetic of Calabi--Yau Manifolds and Mirror Symmetry

TL;DR

This paper investigates the zeta functions of mirror symmetric Calabi--Yau manifolds over finite fields, revealing their dependence on complex structure deformations and exploring implications for mirror symmetry and related number-theoretic functions.

Contribution

It computes explicit zeta functions for specific Calabi--Yau families and proposes conjectures linking these functions to mirror symmetry and modular forms.

Findings

Zeta functions vary with complex structure deformations.

Mirror symmetry exchanges odd and even Betti numbers.

Connections to L-functions of modular forms are suggested.

Abstract

We study mirror symmetric pairs of Calabi--Yau manifolds over finite fields. In particular we compute the number of rational points of the manifolds as a function of the complex structure parameters. The data of the number of rational points of a Calabi--Yau $X/\mathbb{F}_q$ can be encoded in a generating function known as the congruent zeta function. The Weil Conjectures (proved in the 1970s) show that for smooth varieties, these functions take a very interesting form in terms of the Betti numbers of the variety. This has interesting implications for mirror symmetry, as mirror symmetry exchanges the odd and even Betti numbers. Here the zeta functions for a one-parameter family of K3 surfaces, $\mathbb{P}_3[4]$, and a two-parameter family of octics in weighted projective space, $\mathbb{P}_4{}^{(1, 1, 2, 2, 2)} [8]$, are computed. The form of the zeta function at points in the moduli space of complex structures where the manifold is singular (where the Weil conjectures apart from rationality are not applicable), is investigated. The zeta function appears to be sensitive to monomial and non-monomial deformations of complex structure (or equivalently on the mirror side, toric and non-toric divisors). Various conjectures about the form of the zeta function for mirror symmetric pairs are made in light of the results of this calculation. Connections with $L$-functions associated to both elliptic and Siegel modular forms are suggested.