English

On packing total coloring

Combinatorics 2026-05-11 v2

Abstract

In this paper, we introduce a new concept in graph coloring, namely the \textit{packing total coloring}, which extends the idea of packing coloring to both the vertices and the edges of a given graph. More precisely, for a graph GG, a packing total coloring is a mapping c:V(G)E(G){1,2,}c: V(G) \cup E(G) \rightarrow \{1, 2, \ldots\} with the property that for any integer ii, any two distinct elements A,BV(G)E(G)A, B \in V(G) \cup E(G) with c(A)=c(B)=ic(A) = c(B) = i must be at distance at least i+1i+1 from each other. Note that the distance between AA and BB means: a) the usual shortest-path distance between AA and BB if A,BV(G)A, B \in V(G); b) the min{d(a,d),d(a,c),d(b,c),d(b,d)}+1\min \{d(a,d), d(a,c),d(b,c), d(b,d)\}+1 if {A,B}={ab,cd}E(G)\{A, B\} =\{ab, cd\} \subseteq E(G); c) the min{d(a,X),d(b,X)}+1 \min \{d(a,X), d(b,X)\}+1 if {A,B}={ab,X}\{A, B\}=\{ab, X\}, where abE(G)ab \in E(G) and XV(G)X \in V(G). The smallest integer kk such that GG admits a packing total coloring using kk colors is called the \textit{packing total chromatic number}, denoted by χρ(G)\chi_\rho^{''}(G). In addition to introducing this new concept, we provide lower and upper bounds for the packing total chromatic numbers of graphs. Furthermore, we consider packing total chromatic numbers of graphs from the perspective of their maximum degrees and characterize all graphs GG with χρ(G){1,2,3,4,5}\chi_\rho^{''}(G) \in \{1, 2, 3, 4, 5\}.

Keywords

Cite

@article{arxiv.2508.08691,
  title  = {On packing total coloring},
  author = {Jasmina Ferme and Daša Mesarič Štesl},
  journal= {arXiv preprint arXiv:2508.08691},
  year   = {2026}
}
R2 v1 2026-07-01T04:45:39.786Z