English

A Polynomial Upper Bound for Poset Saturation

Combinatorics 2024-05-17 v2

Abstract

Given a finite poset P\mathcal P, we say that a family F\mathcal F of subsets of [n][n] is P\mathcal P-saturated if F\mathcal F does not contain an induced copy of P\mathcal P, but adding any other set to F\mathcal F creates an induced copy of P\mathcal P. The induced saturation number of P\mathcal P, denoted by sat(n,P)\text{sat}^*(n,\mathcal P), is the size of the smallest P\mathcal P-saturated family with ground set [n][n]. In this paper we prove that the saturation number for any given poset grows at worst polynomially. More precisely, we show that sat(n,P)=O(nc)\text{sat}^*(n, \mathcal P)=O(n^c), where cP2/4+1c\leq|\mathcal{P}|^2/4+1 is a constant depending on P\mathcal P only. We obtain this result by bounding the VC-dimension of our family.

Keywords

Cite

@article{arxiv.2310.04634,
  title  = {A Polynomial Upper Bound for Poset Saturation},
  author = {Paul Bastide and Carla Groenland and Maria-Romina Ivan and Tom Johnston},
  journal= {arXiv preprint arXiv:2310.04634},
  year   = {2024}
}

Comments

7 pages, 2 figures

R2 v1 2026-06-28T12:43:07.774Z