Singleton Coalition Graph Chains
Abstract
Let be graph with vertex set and order . A coalition in is a combination of two distinct sets, and , which are disjoint and are not dominating sets of , but is a dominating set of . A coalition partition of is a partition of its vertex set , where each set is either a dominating set of with only one vertex, or it is not a dominating set but forms a coalition with some other set . The coalition number is the maximum cardinality of a coalition partition of . To represent a coalition partition of , a coalition graph is created, where each vertex of the graph corresponds to a member of and two vertices are adjacent if and only if their corresponding sets form a coalition in . A coalition partition of is a singleton coalition partition if every set in consists of a single vertex. If a graph has a singleton coalition partition, then is referred to as a singleton-partition graph. A graph is called a singleton coalition graph of a graph if there exists a singleton coalition partition of such that the coalition graph is isomorphic to . A singleton coalition graph chain with an initial graph is defined as the sequence where all graphs are singleton-partition graphs, and , where represents a singleton coalition partition of . In this paper, we address two open problems posed by Haynes et al. We characterize all graphs of order and minimum degree such that and investigate the singleton coalition graph chain starting with graphs where .
Cite
@article{arxiv.2304.07606,
title = {Singleton Coalition Graph Chains},
author = {Davood Bakhshesh and Michael A. Henning and Dinabandhu Pradhan},
journal= {arXiv preprint arXiv:2304.07606},
year = {2023}
}