The orientability problem in open Gromov-Witten theory

TL;DR

This paper provides an explicit formula for the holonomy of the orientation bundle in open Gromov-Witten theory, resolving orientability issues for moduli spaces of maps with Lagrangian boundary conditions.

Contribution

It introduces a formula for the holonomy of the orientation bundle, resolving orientability questions and relating local systems on moduli spaces to those on Lagrangians and loop spaces.

Findings

Explicit formula for the holonomy of the orientation bundle

Resolved orientability of moduli spaces with Lagrangian boundary conditions

Established isomorphisms of local systems on moduli spaces

Abstract

We give an explicit formula for the holonomy of the orientation bundle of a family of real Cauchy-Riemann operators. A special case of this formula resolves the orientability question for spaces of maps from Riemann surfaces with Lagrangian boundary condition. As a corollary, we show that the local system of orientations on the moduli space of J-holomorphic maps from a bordered Riemann surface to a symplectic manifold is isomorphic to the pull-back of a local system defined on the product of the Lagrangian and its free loop space. As another corollary, we show that certain natural bundles over these moduli spaces have the same local systems of orientations as the moduli spaces themselves (this is a prerequisite for integrating the Euler classes of these bundles). We will apply these conclusions in future papers to construct and compute open Gromov-Witten invariants in a number of settings.