# Adiabatic compactness for holomorphic curves with boundary on nearby   Lagrangians

**Authors:** Dylan Cant, Daren Chen

arXiv: 2302.13391 · 2023-02-28

## TL;DR

This paper extends the compactness theory for holomorphic curves with boundary on Lagrangians that are perturbations of a fixed Lagrangian, showing limits involve holomorphic curves connected by gradient flow lines, with new exponential estimates.

## Contribution

It generalizes previous compactness results by analyzing limits of holomorphic curves with boundary on nearby Lagrangians converging to a fixed one, introducing exponential estimates at the interface.

## Key findings

- Limits are configurations of holomorphic curves joined by gradient flow lines.
- Established exponential estimates at the interface between holomorphic and gradient flow parts.
- Extended compactness theory to sequences of Lagrangians converging to a fixed Lagrangian.

## Abstract

In his 1989 paper, Floer established a connection between holomorphic strips with boundary on a Lagrangian $L$ and a small Hamiltonian push-off $L_{f}$, and gradient flow lines for the function $f$. The present paper studies the compactness theory for holomorphic curves $u_{n}$ whose boundary components lie on Hamiltonian perturbations $L_{n}^{1},\dots,L^{N}_{n}$ of a fixed Lagrangian $L$, where each sequence of nearby Lagrangians $L^{j}_{n}$ converges to $L$ as $n\to\infty$. Generalizing earlier work of Oh, Fukaya, Ekholm, and Zhu, we prove that the limit of a sequence of such holomorphic maps is a configuration consisting of holomorphic curves with boundary on $L$ joined by gradient flow lines connecting points on the boundary of holomorphic pieces. The key new result is an exponential estimate analyzing the interface between the holomorphic parts and the gradient flow line parts.

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## Figures

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## References

29 references — full list in the complete paper: https://tomesphere.com/paper/2302.13391/full.md

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Source: https://tomesphere.com/paper/2302.13391