On Hofer Energy of J-holomorphic Curves for Asymptotically Cylindrical J

TL;DR

This paper establishes bounds on the Hofer energy of punctured J-holomorphic curves in asymptotically cylindrical manifolds and applies these results to prove a multiplicity version of Gromov's Monotonicity Theorem, providing area bounds related to intersection multiplicity.

Contribution

It introduces a bound for the generalized Hofer energy of punctured J-holomorphic curves in asymptotically cylindrical ends and applies it to extend Gromov's Monotonicity Theorem with multiplicity considerations.

Findings

Bound for generalized Hofer energy of punctured J-holomorphic curves.

A version of Gromov's Monotonicity Theorem with multiplicity.

Upper bounds on the number of intersections with a point depending on symplectic area.

Abstract

In this paper, we provide a bound for the generalized Hofer energy of punctured $J$-holomorphic curves in almost complex manifolds with asymptotically cylindrical ends. As an application, we prove a version of Gromov's Monotonicity Theorem with multiplicity. Namely, for a closed symplectic manifold $(M,\omega)$ with a compatible almost complex structure $J$ and a ball $B$ in $M,$ there exists a constant $\hbar>0,$ such that any $J$-holomorphic curve $\tilde{u}$ passing through the center of $B$ for $k$ times (counted with multiplicity) with boundary mapped to $\partial B$ has symplectic area $\int_{\tilde{u}^{-1}(B)}\tilde{u}^{*}\omega>k\hbar,$ where the constant $\hbar$ depends only on $(M,\omega,J)$ and the radius of $B.$ As a consequence, the number of times that any closed $J$-holomorphic curve in $M$ passes through a point is bounded by a constant depending only on $(M,\omega,J)$ and the symplectic area of $\tilde{u}$. Here $J$ is any $\omega-$compatible smooth almost complex structure on $M$. In particular, we do not require $J$ to be integrable.