Frugal coloring of graphs revisited

TL;DR

This paper revisits frugal graph colorings, establishing complexity results, bounds, exact values for specific graph classes, and Nordhaus-Gaddum inequalities, advancing understanding of frugal coloring properties and computational aspects.

Contribution

It proves NP-completeness for the decision problem of , provides linear-time algorithms for trees, establishes bounds and exact values for various graph classes, and derives Nordhaus-Gaddum inequalities for .

Findings

NP-complete decision problem for  in bipartite graphs.

Linear-time algorithm for  in trees.

Exact  values for block graphs and certain graph products.

Abstract

Given a graph $G$ and a positive integer $t$, an independent set $S\subseteq V(G)$ is $t$-frugal if every vertex has at most $t$ neighbors in $S$. A $t$-frugal coloring of $G$ is a partition of its vertex set into $t$-frugal independent sets. The maximum cardinality of a $t$-frugal independent set in $G$ is denoted by $\alpha_t^f(G)$, while the minimum cardinality of a $t$-frugal coloring of $G$, $\chi_t^f(G)$, is called the $t$-frugal chromatic number of $G$. Frugal colorings were introduced in 1998 and studied later in just a handful of papers. In this paper, we revisit this concept. While the NP-hardness of frugal coloring is known, we prove that the decision version of $\alpha_t^f$ is NP-complete even for bipartite graphs, and present a linear-time algorithm to determine its value for trees. We prove a general sharp lower bound on $\chi_{t}^{f}(G)$ expressed in terms of $\alpha_{t}^{f}(G)$ and size of $G$. We also give a sharp upper bound on the $\alpha_2^f$ of any graph $G$, which in the case of graphs with minimum degree $\delta\geq2$ simplifies to $\alpha_2^f(G)\le 2n/(\delta+2)$. We prove that $3\le\chi_2^f(G)\le 5$ holds for any graph $G$ with $\Delta(G)=3$. For several classes of graphs such as block graphs, the Cartesian and strong products of multiple two-way infinite paths, we determine the exact values of $\alpha_2^f$. We provide sharp bounds on the $\alpha_2^f$ in all four standard graph products, which are expressed as different invariants of their factors. Finally, we obtain Nordhaus-Gaddum type inequalities for the sum of the $2$-frugal chromatic numbers of $G$ and its complement from below and from above by functions of the order of $G$. For the upper bound $\chi_{2}^{f}(G)+\chi_{2}^{f}(\overline{G})\leq 3n/2$, we characterize the family of extremal graphs $G$.