Hodge-theoretic Open/Closed Correspondence

Abstract

We continue the B-model development of the open/closed correspondence proposed by Mayr and Lerche-Mayr, complementing the A-model study in the preceding joint works with Liu and providing a Hodge-theoretic perspective. Given a corresponding pair of open geometry on a toric Calabi-Yau 3-orbifold X relative to a framed Aganagic-Vafa brane L and closed geometry on a toric Calabi-Yau 4-orbifold X, we consider the Hori-Vafa mirrors X and X, where the mirror of L can be given by a family of hypersurfaces Y ⊂ X. We show that the Picard-Fuchs system associated to X extends that associated to X and characterize the full solution space in terms of the open string data. Furthermore, we construct a correspondence between integral 4-cycles in X and relative 3-cycles in (X, Y) under which the periods of the former match the relative periods of the latter. On the dual side, we identify the variations of mixed Hodge structures on the middle-dimensional cohomology of X with that on the middle-dimensional relative cohomology of (X, Y) up to a Tate twist.