Square pegs between two graphs

Greene, Joshua Evan; Lobb, Andrew

Square pegs between two graphs

Greene, Joshua Evan; Lobb, Andrew

Authors

Joshua Evan Greene

Professor Andrew Lobb andrew.lobb@durham.ac.uk
Professor

Abstract

We show that there exists an inscribed square in a Jordan curve given as the union of two graphs of functions of Lipschitz constant less than 1+ √ 2. We are motivated by Tao's result that there exists such a square in the case of Lipschitz constant less than 1. In the case of Lipschitz constant 1, we show that the Jordan curve inscribes rectangles of every similarity class. Our approach involves analysing the change in the spectral invariants of the Jordan Floer homology under perturbations of the Jordan curve.

Citation

Greene, J. E., & Lobb, A. (in press). Square pegs between two graphs. Commentarii Mathematici Helvetici: A Journal of the Swiss Mathematical Society,

Journal Article Type	Article
Acceptance Date	Mar 16, 2025
Deposit Date	Apr 2, 2025
Publicly Available Date	Apr 2, 2025
Journal	Commentarii Mathematici Helvetici: A Journal of the Swiss Mathematical Society
Print ISSN	0010-2571
Electronic ISSN	1420-8946
Publisher	EMS Press
Peer Reviewed	Peer Reviewed
Public URL	https://durham-repository.worktribe.com/output/3773700