Product-free sets in the free group-Reference-Cited by-同舟云学术

Product-free sets in the free group

Published:2023 Issue: Volume: Page:
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Container-title:Proceedings of the 12th European Conference on Combinatorics, Graph Theory and Applications
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Author:

Ortega Miquel,Rué Juanjo,Serra Oriol

Abstract

We prove that product-free sets of the free group over a finite alphabet have maximum density $1/2$ with respect to the natural measure that assigns total weight one to each set of irreducible words of a given length. This confirms a conjecture of Leader, Letzter, Narayanan and Walters. In more general terms, we actually prove that strongly $k$-product-free sets have maximum density $1/k$ in terms of the said measure. The bounds are tight.

Publisher

Masaryk University Press

Reference9 articles.

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4. Imre Leader, Shoham Letzter, Bhargav Narayanan, and Mark Walters. Product-free sets in the free semigroup. European Journal of Combinatorics, 83:103003, 2020.

5. Tomasz Łuczak and Tomasz Schoen. On innite sum-free sets of natural numbers. Journal of Number Theory, 66(2):211-224, 1997.

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1. Product-free sets in the free group;Proceedings of the 12th European Conference on Combinatorics, Graph Theory and Applications;2023