Monodromy action of mirror stops for toric Calabi-Yau surfaces

TL;DR

This paper explores the monodromy action on derived categories of toric Calabi-Yau surfaces via Legendrian moduli spaces, constructing braid group actions and extending mirror symmetry to stacks.

Contribution

It introduces a Legendrian perspective to study monodromy actions and constructs an annular braid-group action on Fukaya categories for toric surfaces.

Findings

Constructed an annular braid-group action on the Fukaya category for A_{n-1} singularity.

Revealed the standard braid subgroup recovers Seidel--Thomas autoequivalence.

Extended homological mirror symmetry to semiprojective toric Deligne-Mumford stacks.

Abstract

Mirror symmetry predicts an action by the fundamental group of a conjectural stringy K\"ahler moduli space on the derived category of an algebraic variety. For a toric variety, a model for this space is understood, but constructing the action is still an open problem in general. We propose that this action can be studied on the $A$-side via a moduli space of Legendrians isotopic to the FLTZ Legendrian. For the $A_{n-1}$ singularity, we construct an annular braid-group action on the corresponding partially wrapped Fukaya category by exact autoequivalences. The standard braid subgroup recovers the Seidel--Thomas action on the derived category, while the additional annular generator corresponds to tensor product with $\mathcal O(-1)$. We additionally extend the Floer theoretic approach to homological mirror symmetry for toric varities to the setting of semiprojective toric Deligne-Mumford stacks over an arbitrary field.