English

Upper Bounds for Sequence Saturation

Combinatorics 2025-12-22 v1

Abstract

In this paper, we study the saturation function Sat(n,u)\mathrm{Sat}(n,u) for sequences. Saturation for sequences was introduced by Anand, Geneson, Kaustav, and Tsai (2021), who proved that Sat(n,u)=O(n)\mathrm{Sat}(n,u)=O(n) for two-letter sequences uu and conjectured that this bound holds for all sequences. We present an algorithm that constructs a uu-saturated sequence on nn letters and apply it to show Sat(n,u)=O(n)\mathrm{Sat}(n,u)=O(n) for several families of sequences uu, including all repetitions of the form abcabcabcabc\dots. We further establish Sat(n,u)=O(n)\mathrm{Sat}(n,u)=O(n) for a broad class of sequences of the form aabbaa\dots bb. In addition, we prove that for most sequences uu, there exists an infinite uu-saturated sequence. For three-letter sequences of the form abcxyzabc\dots xyz, where a,b,ca,b,c are distinct and xyzxyz is a permutation of abcabc, we show -- under certain structural assumptions on uu -- that Sat(n,u)=O(n)\mathrm{Sat}(n,u)=O(n). Finally, we describe a linear program that computes the exact value of Sat(n,u)\mathrm{Sat}(n,u) for arbitrary nn and uu.

Keywords

Cite

@article{arxiv.2512.17683,
  title  = {Upper Bounds for Sequence Saturation},
  author = {Shihan Kanungo},
  journal= {arXiv preprint arXiv:2512.17683},
  year   = {2025}
}

Comments

16 pages, 5 figures

R2 v1 2026-07-01T08:33:41.132Z