Twin Lagrangian fibrations in mirror symmetry

TL;DR

This paper demonstrates the existence of twin Lagrangian fibrations on specific symplectic manifolds and links them to fibrations by rigid analytic cycles on their mirrors using family Floer theory.

Contribution

It establishes a connection between twin Lagrangian fibrations and rigid analytic fibrations on mirror manifolds, advancing understanding in mirror symmetry.

Findings

Existence of twin Lagrangian fibrations on certain symplectic manifolds.

Twin fibrations are induced from rigid analytic subvarieties on the mirror.

Provides applications illustrating the constructions.

Abstract

A twin Lagrangian fibration, originally introduced by Yau and the first author, is roughly a geometric structure consisting of two Lagrangian fibrations whose fibers intersect with each other cleanly. In this paper, we show the existence of twin Lagrangian fibrations on certain symplectic manifolds whose mirrors are fibered by rigid analytic cycles. Using family Floer theory in the sense of Fukaya and Abouzaid, these twin Lagrangian fibrations are shown to be induced from fibrations by rigid analytic subvarieties on the mirror. As additional evidences, we discuss two simple applications of our constructions.