Mirror symmetry for double cover Calabi--Yau varieties

Abstract

The presented paper is a continuation of the series of papers arXiv:1810.00606 and arXiv:1903.09373. In this paper, utilizing Batyrev and Borisov's duality construction on nef-partitions, we generalize the recipe in arXiv:1810.00606 and arXiv:1903.09373 to construct a pair of singular double cover Calabi--Yau varieties (Y,Y) over toric manifolds and compute their topological Euler characteristics and Hodge numbers. In the 3-dimensional cases, we show that (Y,Y) forms a topological mirror pair, i.e., hp,q(Y)=h3-p,q(Y) for all p,q.