English

On Edge-Colored Saturation Problems

Combinatorics 2017-12-04 v1

Abstract

Let C\mathcal{C} be a family of edge-colored graphs. A tt-edge colored graph GG is (C,t)(\mathcal{C}, t)-saturated if GG does not contain any graph in C\mathcal{C} but the addition of any edge in any color in [t][t] creates a copy of some graph in C\mathcal{C}. Similarly to classical saturation functions, define satt(n,C)\mathrm{sat}_t(n, \mathcal{C}) to be the minimum number of edges in a (C,t)(\mathcal{C},t) saturated graph. Let Cr(H)\mathcal{C}_r(H) be the family consisting of every edge-colored copy of HH which uses exactly rr colors. In this paper we consider a variety of colored saturation problems. We determine the order of magnitude for satt(n,Cr(Kk))\mathrm{sat}_t(n, \mathcal{C}_r(K_k)) for all rr, showing a sharp change in behavior when r(k12)+2r\geq \binom{k-1}{2}+2. A particular case of this theorem proves a conjecture of Barrus, Ferrara, Vandenbussche, and Wenger. We determine satt(n,C2(K3))\mathrm{sat}_t(n, \mathcal{C}_2(K_3)) exactly and determine the extremal graphs. Additionally, we document some interesting irregularities in the colored saturation function.

Keywords

Cite

@article{arxiv.1712.00163,
  title  = {On Edge-Colored Saturation Problems},
  author = {Michael Ferrara and Daniel Johnston and Sarah Loeb and Florian Pfender and Alex Schulte and Heather C. Smith and Eric Sullivan and Michael Tait and Casey Tompkins},
  journal= {arXiv preprint arXiv:1712.00163},
  year   = {2017}
}
R2 v1 2026-06-22T23:03:17.649Z