English

Coloring by Pushing Vertices

Combinatorics 2025-05-09 v1

Abstract

Let GG be a graph of order nn, maximum degree at most Δ\Delta, and no component of order 22. Inspired by the famous 1-2-3-conjecture, Bensmail, Marcille, and Orenga define a proper pushing scheme of GG as a function ρ:V(G)N0\rho:V(G)\to\mathbb{N}_0 for which σ:V(G)N0:u(1+ρ(u))dG(u)+vNG(u)ρ(v)\sigma:V(G)\to\mathbb{N}_0:u\mapsto \left(1+\rho(u)\right)d_G(u)+\sum_{v\in N_G(u)}\rho(v) is a vertex coloring, that is, adjacent vertices receive different values under σ\sigma. They show the existence of a proper pushing scheme ρ\rho with max{ρ(u):uV(G)}Δ2\max\{ \rho(u):u\in V(G)\}\leq \Delta^2 and conjecture that this upper bound can be improved to Δ\Delta. We show their conjecture for cubic graphs and regular bipartite graphs. Furthermore, we show the existence of a proper pushing scheme ρ\rho with uV(G)ρ(u)(2Δ2+Δ)n/6\sum_{u\in V(G)}\rho(u)\leq \left(2\Delta^2+\Delta\right)n/6.

Keywords

Cite

@article{arxiv.2505.05252,
  title  = {Coloring by Pushing Vertices},
  author = {Dieter Rautenbach and Laurin Schwartze and Florian Werner},
  journal= {arXiv preprint arXiv:2505.05252},
  year   = {2025}
}
R2 v1 2026-06-28T23:25:47.857Z