Mirror Symmetry for Toric Branes on Compact Hypersurfaces

TL;DR

This paper employs toric geometry to analyze open string mirror symmetry on compact Calabi-Yau manifolds, deriving differential equations that connect mirror maps and partition functions, and computing enumerative invariants.

Contribution

It introduces a hypergeometric system for open/closed mirror symmetry on toric hypersurfaces and establishes a correspondence between toric polyhedra and brane geometries.

Findings

Derived differential equations for mirror maps and partition functions.

Applied the method to examples with various brane moduli.

Predicted enumerative invariants from instanton expansions.

Abstract

We use toric geometry to study open string mirror symmetry on compact Calabi-Yau manifolds. For a mirror pair of toric branes on a mirror pair of toric hypersurfaces we derive a canonical hypergeometric system of differential equations, whose solutions determine the open/closed string mirror maps and the partition functions for spheres and discs. We define a linear sigma model for the brane geometry and describe a correspondence between dual toric polyhedra and toric brane geometries. The method is applied to study examples with obstructed and classically unobstructed brane moduli at various points in the deformation space. Computing the instanton expansion at large volume in the flat coordinates on the open/closed deformation space we obtain predictions for enumerative invariants.