A reverse isoperimetric inequality for J-holomorphic curves

TL;DR

This paper establishes a reverse isoperimetric inequality for J-holomorphic curves with Lagrangian boundary conditions, linking boundary length and area, and introduces an invariant for Lagrangian submanifolds with applications to moduli space compactness.

Contribution

It proves a new reverse isoperimetric inequality for J-holomorphic curves, defines an invariant for Lagrangian submanifolds, and applies these results to moduli space compactness and superpotential convergence.

Findings

Boundary length is dominated by a constant times area for J-holomorphic curves.

The invariant for Lagrangian submanifolds is calculated as 2π for RP^n in CP^n.

Results imply compactness of moduli spaces and convergence of superpotential.

Abstract

We prove that the length of the boundary of a $J$-holomorphic curve with Lagrangian boundary conditions is dominated by a constant times its area. The constant depends on the symplectic form, the almost complex structure, the Lagrangian boundary conditions and the genus. A similar result holds for the length of the real part of a real $J$-holomorphic curve. The infimum over $J$ of the constant properly normalized gives an invariant of Lagrangian submanifolds. We calculate this invariant to be $2\pi$ for the Lagrangian submanifold $\mathbb R P^n \subset \mathbb C P^n.$ We apply our result to prove compactness of moduli of $J$-holomorphic maps to non-compact target spaces that are asymptotically exact. In a different direction, our result implies the adic convergence of the superpotential.