Total Domination, Separated Clusters, CD-Coloring: Algorithms and Hardness
Abstract
Domination and coloring are two classic problems in graph theory. The major focus of this paper is the CD-COLORING problem which combines the flavours of domination and colouring. Let be an undirected graph. A proper vertex coloring of is a if each color class has a dominating vertex in . The minimum integer for which there exists a of using colors is called the cd-chromatic number, . A set is a total dominating set if any vertex in has a neighbor in . The total domination number, of is the minimum integer such that has a total dominating set of size . A set is a if no two vertices in lie at a distance 2 in . The separated-cluster number, , of is the maximum integer such that has a separated-cluster of size . In this paper, first we explore the connection between CD-COLORING and TOTAL DOMINATION. We prove that CD-COLORING and TOTAL DOMINATION are NP-Complete on triangle-free -regular graphs for each fixed integer . We also study the relationship between the parameters and . Analogous to the well-known notion of `perfectness', here we introduce the notion of `cd-perfectness'. We prove a sufficient condition for a graph to be cd-perfect (i.e. , for any induced subgraph of ) which is also necessary for certain graph classes (like triangle-free graphs). Here, we propose a generalized framework via which we obtain several exciting consequences in the algorithmic complexities of special graph classes. In addition, we settle an open problem by showing that the SEPARATED-CLUSTER is polynomially solvable for interval graphs.
Keywords
Cite
@article{arxiv.2307.12073,
title = {Total Domination, Separated Clusters, CD-Coloring: Algorithms and Hardness},
author = {Dhanyamol Antony and L. Sunil Chandran and Ankit Gayen and Shirish Gosavi and Dalu Jacob},
journal= {arXiv preprint arXiv:2307.12073},
year = {2024}
}