Quantitative Results on Symplectic Barriers

Pazit Haim-Kislev; Richard Hind; Yaron Ostrover

arXiv:2404.19396·math.SG·October 10, 2025

Quantitative Results on Symplectic Barriers

Pazit Haim-Kislev, Richard Hind, Yaron Ostrover

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TL;DR

This paper provides quantitative insights into symplectic barriers, specifically analyzing the symplectic size of Euclidean balls with certain subspaces removed, addressing a question in symplectic geometry.

Contribution

It offers new quantitative results on symplectic barriers, particularly regarding the symplectic size of Euclidean balls with codimension-two subspaces removed.

Findings

01

Quantitative bounds on symplectic size of specific geometric configurations

02

Answer to a previously raised question in symplectic geometry

03

Insights into the structure of symplectic barriers in Euclidean spaces

Abstract

In this paper we present some quantitative results concerning symplectic barriers. In particular, we answer a question raised by Sackel, Song, Varolgunes, and Zhu regarding the symplectic size of the $2 n$ -dimensional Euclidean ball with a codimension-two linear subspace removed.

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TopicsSpace Satellite Systems and Control