English

Induced and non-induced poset saturation problems

Combinatorics 2022-07-27 v3

Abstract

A subfamily GF2[n]\mathcal{G}\subseteq \mathcal{F}\subseteq 2^{[n]} of sets is a non-induced (weak) copy of a poset PP in F\mathcal{F} if there exists a bijection i:PGi:P\rightarrow \mathcal{G} such that pPqp\le_P q implies i(p)i(q)i(p)\subseteq i(q). In the case where in addition pPqp\le_P q holds if and only if i(p)i(q)i(p)\subseteq i(q), then G\mathcal{G} is an induced (strong) copy of PP in F\mathcal{F}. We consider the minimum number sat(n,P)sat(n,P) [resp.\ sat(n,P)sat^*(n,P)] of sets that a family F2[n]\mathcal{F}\subseteq 2^{[n]} can have without containing a non-induced [induced] copy of PP and being maximal with respect to this property, i.e., the addition of any G2[n]FG\in 2^{[n]}\setminus \mathcal{F} creates a non-induced [induced] copy of PP. We prove for any finite poset PP that sat(n,P)2P2sat(n,P)\le 2^{|P|-2}, a bound independent of the size nn of the ground set. For induced copies of PP, there is a dichotomy: for any poset PP either sat(n,P)KPsat^*(n,P)\le K_P for some constant depending only on PP or sat(n,P)log2nsat^*(n,P)\ge \log_2 n. We classify several posets according to this dichotomy, and also show better upper and lower bounds on sat(n,P)sat(n,P) and sat(n,P)sat^*(n,P) for specific classes of posets. Our main new tool is a special ordering of the sets based on the colexicographic order. It turns out that if PP is given, processing the sets in this order and adding the sets greedily into our family whenever this does not ruin non-induced [induced] PP-freeness, we tend to get a small size non-induced [induced] PP-saturating family.

Keywords

Cite

@article{arxiv.2003.04282,
  title  = {Induced and non-induced poset saturation problems},
  author = {Balázs Keszegh and Nathan Lemons and Ryan R. Martin and Dömötör Pálvölgyi and Balázs Patkós},
  journal= {arXiv preprint arXiv:2003.04282},
  year   = {2022}
}

Comments

Added appendix to v3 from v1, as it was accidentally missing from v2

R2 v1 2026-06-23T14:09:07.963Z