English

On strongly and robustly critical graphs

Combinatorics 2026-02-27 v3

Abstract

In extremal combinatorics, it is common to focus on structures that are minimal with respect to a certain property. In particular, critical and list-critical graphs occupy a prominent place in graph coloring theory. Stiebitz, Tuza, and Voigt introduced strongly critical graphs, i.e., graphs that are kk-critical yet LL-colorable with respect to every non-constant assignment LL of lists of size k1k-1. Here we strengthen this notion and extend it to the framework of DP-coloring (or correspondence coloring) by defining robustly kk-critical graphs as those that are not (k1)(k-1)-DP-colorable, but only due to the fact that χ(G)=k\chi(G) = k. We then seek general methods for constructing robustly critical graphs. Our main result is that if GG is a critical graph (with respect to ordinary coloring), then the join of GG with a sufficiently large clique is robustly critical; this is new even for strong criticality.

Keywords

Cite

@article{arxiv.2408.04538,
  title  = {On strongly and robustly critical graphs},
  author = {Anton Bernshteyn and Hemanshu Kaul and Jeffrey A. Mudrock and Gunjan Sharma},
  journal= {arXiv preprint arXiv:2408.04538},
  year   = {2026}
}

Comments

15 pages, 2 figures

R2 v1 2026-06-28T18:07:50.194Z