$\mathcal{O}(VE)$ time algorithms for the Grundy (First-Fit) chromatic number of block graphs and graphs with sufficiently large girth

TL;DR

This paper presents efficient algorithms to compute the Grundy (First-Fit) chromatic number for block graphs and certain graphs with large girth, providing bounds and approximation ratios.

Contribution

It introduces $ ilde{O}(VE)$ algorithms for calculating the Grundy number in block graphs and graphs with large girth, along with bounds for graphs with cut-vertices.

Findings

An $ ilde{O}(VE)$ algorithm for block graphs' Grundy number.

Upper bounds for graphs with cut-vertices.

Approximation algorithm for graphs with large girth.

Abstract

The Grundy (or First-Fit) chromatic number of a graph $G=(V,E)$, denoted by $\Gamma(G)$ (or $\chi_{_{\sf FF}}(G)$), is the maximum number of colors used by a First-Fit (greedy) coloring of $G$. To determine $\Gamma(G)$ is NP-complete for various classes of graphs. Also there exists a constant $c>0$ such that the Grundy number is hard to approximate within the ratio $c$. We first obtain an $\mathcal{O}(VE)$ algorithm to determine the Grundy number of block graphs i.e. graphs in which every biconnected component is complete subgraph. We prove that the Grundy number of a general graph $G$ with cut-vertices is upper bounded by the Grundy number of a block graph corresponding to $G$. This provides a reasonable upper bound for the Grundy number of graphs with cut-vertices. Next, define $\Delta_2(G)={\max}_{u\in G}~ {\max}_{v\in N(u):d(v)\leq d(u)} d(v)$. We obtain an $\mathcal{O}(VE)$ algorithm to determine $\Gamma(G)$ for graphs $G$ whose girth $g$ is at least $2\Delta_2(G)+1$. This algorithm provides a polynomial time approximation algorithm within ratio $\min \{1, (g+1)/(2\Delta_2(G)+2)\}$ for $\Gamma(G)$ of general graphs $G$ with girth $g$.