English

On {\lambda}-backbone coloring of cliques with tree backbones in linear time

Discrete Mathematics 2024-04-12 v3 Combinatorics

Abstract

A λ\lambda-backbone coloring of a graph GG with its subgraph (also called a backbone) HH is a function c ⁣:V(G){1,,k}c \colon V(G) \rightarrow \{1,\dots, k\} ensuring that cc is a proper coloring of GG and for each {u,v}E(H)\{u,v\} \in E(H) it holds that c(u)c(v)λ|c(u) - c(v)| \ge \lambda. In this paper we propose a way to color cliques with tree and forest backbones in linear time that the largest color does not exceed max{n,2λ}+Δ(H)2logn\max\{n, 2 \lambda\} + \Delta(H)^2 \lceil\log{n} \rceil. This result improves on the previously existing approximation algorithms as it is (Δ(H)2logn)(\Delta(H)^2 \lceil\log{n} \rceil)-absolutely approximate, i.e. with an additive error over the optimum. We also present an infinite family of trees TT with Δ(T)=3\Delta(T) = 3 for which the coloring of cliques with backbones TT require to use at least max{n,2λ}+Ω(logn)\max\{n, 2 \lambda\} + \Omega(\log{n}) colors for λ\lambda close to n2\frac{n}{2}.

Keywords

Cite

@article{arxiv.2107.05772,
  title  = {On {\lambda}-backbone coloring of cliques with tree backbones in linear time},
  author = {Krzysztof Michalik and Krzysztof Turowski},
  journal= {arXiv preprint arXiv:2107.05772},
  year   = {2024}
}

Comments

21 pages, 3 figures

R2 v1 2026-06-24T04:07:46.816Z