# A remark on deformation of Gromov non-squeezing

**Authors:** Yasha Savelyev

arXiv: 2302.13985 · 2025-12-03

## TL;DR

This paper explores the persistence of Gromov non-squeezing under small deformations of the symplectic form, providing partial proofs in specific cases and introducing a novel trap method for holomorphic curves.

## Contribution

It conjectures the stability of Gromov non-squeezing under $C^0$-small symplectic form deformations and proves this in certain low-dimensional cases.

## Key findings

- Gromov non-squeezing persists under specific deformations
- Introduces a trap method for holomorphic curves
- Proves conjecture in dimension four when R < √2 r

## Abstract

Let $R,r$ be as in the classical Gromov non-squeezing theorem, and let $\epsilon = (\pi R ^{2} - \pi r ^{2})/ \pi r ^{2} $. We first conjecture that the Gromov non-squeezing phenomenon persists for deformations of the symplectic form on the range $C ^{0}$ (w.r.t. the standard metric) $\epsilon $-nearby to the standard symplectic form. We prove this in some special cases, in particular when the dimension is four and when $R < \sqrt 2 r$. Given such a perturbation, we can no longer compactify the range and hence the classical Gromov argument breaks down. Our main method consists of a certain trap idea for holomorphic curves, analogous to traps in dynamical systems.

## Full text

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## References

6 references — full list in the complete paper: https://tomesphere.com/paper/2302.13985/full.md

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Source: https://tomesphere.com/paper/2302.13985