English

$S$-packing chromatic vertex-critical graphs

Combinatorics 2026-01-23 v1

Abstract

For a non-decreasing sequence of positive integers S=(s1,s2,)S = (s_1,s_2,\ldots), the {\em SS-packing chromatic number} χS(G)\chi_S(G) of GG is the smallest integer kk such that the vertex set of GG can be partitioned into sets XiX_i, i[k]i \in [k], where vertices in XiX_i are pairwise at distance greater than sis_i. In this paper we introduce SS-packing chromatic vertex-critical graphs, χS\chi_{S}-critical for short, as the graphs in which χS(Gu)<χS(G)\chi_{S}(G-u)<\chi_{S}(G) for every uV(G)u\in V(G). This extends the earlier concept of the packing chromatic vertex-critical graphs. We show that if GG is χS\chi_{S}-critical, then the set {χS(G)χS(Gu);uV(G)}\{ \chi_{S}(G)-\chi_{S}(G-u); \, u\in V(G) \} can be almost arbitrary. If GG is χS\chi_{S}-critical and χS(G)=k\chi_{S}(G)=k (kNk\in \mathbb{N}), then GG is called kk-χS\chi_{S}-critical. We characterize 33-χS\chi_{S}-critical graphs and partially characterize 44-χS\chi_{S}-critical graphs when s1>1s_1>1. We also deal with kk-χS\chi_{S}-criticality of trees and caterpillars.

Keywords

Cite

@article{arxiv.2001.09362,
  title  = {$S$-packing chromatic vertex-critical graphs},
  author = {Přemysl Holub and Marko Jakovac and Sandi Klavžar},
  journal= {arXiv preprint arXiv:2001.09362},
  year   = {2026}
}
R2 v1 2026-06-23T13:20:41.226Z