On λ-backbone coloring of cliques with tree backbones in linear time

Abstract

A λ-backbone coloring of a graph G with its subgraph (also called a backbone) H is a function c V(G) → \1,…, k\ ensuring that c is a proper coloring of G and for each \u,v\ ∈ E(H) it holds that |c(u) - c(v)| λ. 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 \n, 2 λ\ + (H)2 n . This result improves on the previously existing approximation algorithms as it is ((H)2 n )-absolutely approximate, i.e. with an additive error over the optimum. We also present an infinite family of trees T with (T) = 3 for which the coloring of cliques with backbones T require to use at least \n, 2 λ\ + (n) colors for λ close to n2.