The structure and density of k-product-free sets in the free semigroup

Abstract

The free semigroup F over a finite alphabet A is the set of all finite words with letters from A equipped with the operation of concatenation. A subset S of F is k-product-free if no element of S can be obtained by concatenating k words from S, and strongly k-product-free if no element of S is a (non-trivial) concatenation of at most k words from S. We prove that a k-product-free subset of F has upper Banach density at most 1/(k), where (k) = \ k - 1\. We also determine the structure of the extremal k-product-free subsets for all k \3, 5, 7, 13\; a special case of this proves a conjecture of Leader, Letzter, Narayanan, and Walters. We further determine the structure of all strongly k-product-free sets with maximum density. Finally, we prove that k-product-free subsets of the free group have upper Banach density at most 1/(k), which confirms a conjecture of Ortega, Ru\'e, and Serra.