The Hodge Numbers of Divisors of Calabi-Yau Threefold Hypersurfaces

Abstract

We prove a formula for the Hodge numbers of square-free divisors of Calabi-Yau threefold hypersurfaces in toric varieties. Euclidean branes wrapping divisors affect the vacuum structure of Calabi-Yau compactifications of type IIB string theory, M-theory, and F-theory. Determining the nonperturbative couplings due to Euclidean branes on a divisor D requires counting fermion zero modes, which depend on the Hodge numbers hi(OD). Suppose that X is a smooth Calabi-Yau threefold hypersurface in a toric variety V, and let D be the restriction to X of a square-free divisor of V. We give a formula for hi(OD) in terms of combinatorial data. Moreover, we construct a CW complex PD such that hi(OD)=hi(PD). We describe an efficient algorithm that makes possible for the first time the computation of sheaf cohomology for such divisors at large h1,1. As an illustration we compute the Hodge numbers of a class of divisors in a threefold with h1,1=491. Our results are a step toward a systematic computation of Euclidean brane superpotentials in Calabi-Yau hypersurfaces.