A quantitative version of Tao’s result on the Toeplitz Square Peg Problem

Authors

  • Ludovic Rifford Author

Abstract

Building on a result by Tao, we show that a certain type of simple closed curve in the plane given by the union of the graphs of two 1-Lipschitz functions inscribes a square whose sidelength is bounded from below by a universal constant times the maximum of the difference of the two functions.

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Published

03-05-2022

Issue

No. 8 (2022)

Section

Articles

License

Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

How to Cite

Rifford, L. (2022). A quantitative version of Tao’s result on the Toeplitz Square Peg Problem. North-Western European Journal of Mathematics, 8, 61-90. https://nwejm.univ-lille.fr/index.php/nwejm/article/view/10