A Polynomial Upper Bound for Poset Saturation
Combinatorics
2024-05-17 v2
Abstract
Given a finite poset , we say that a family of subsets of is -saturated if does not contain an induced copy of , but adding any other set to creates an induced copy of . The induced saturation number of , denoted by , is the size of the smallest -saturated family with ground set . In this paper we prove that the saturation number for any given poset grows at worst polynomially. More precisely, we show that , where is a constant depending on only. We obtain this result by bounding the VC-dimension of our family.
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