The induced saturation problem for posets
Abstract
For a fixed poset , a family of subsets of is induced -saturated if does not contain an induced copy of , but for every subset of such that , is an induced subposet of . The size of the smallest such family is denoted by . Keszegh, Lemons, Martin, P\'alv\"olgyi and Patk\'os [Journal of Combinatorial Theory Series A, 2021] proved that there is a dichotomy of behaviour for this parameter: given any poset , either or . In this paper we improve this general result showing that either or . Our proof makes use of a Tur\'an-type result for digraphs. Curiously, it remains open as to whether our result is essentially best possible or not. On the one hand, a conjecture of Ivan states that for the so-called diamond poset we have ; so if true this conjecture implies our result is tight up to a multiplicative constant. On the other hand, a conjecture of Keszegh, Lemons, Martin, P\'alv\"olgyi and Patk\'os states that given any poset , either or . We prove that this latter conjecture is true for a certain class of posets .
Cite
@article{arxiv.2207.03974,
title = {The induced saturation problem for posets},
author = {Andrea Freschi and Simón Piga and Maryam Sharifzadeh and Andrew Treglown},
journal= {arXiv preprint arXiv:2207.03974},
year = {2023}
}
Comments
12 pages, author accepted manuscript. To appear in Combinatorial Theory. Statement of main result very slightly improved