Perfect coalition in graphs

TL;DR

This paper introduces the concept of perfect coalition partitions in graphs, exploring their properties, bounds, and specific cases such as trees, triangle-free graphs, and graphs with minimum degree one.

Contribution

It initiates the study of perfect coalition partitions, providing bounds, characterizations, and analysis for special classes of graphs.

Findings

Bound on the number of perfect coalitions per vertex based on maximum degree

Characterization of perfect coalitions in graphs with minimum degree one

Analysis of perfect coalition numbers in trees and triangle-free graphs

Abstract

\noindent A perfect dominating set in a graph $G=(V,E)$ is a subset $S \subseteq V$ such that each vertex in $V \setminus S$ has exactly one neighbor in $S$. A perfect coalition in $G$ consists of two disjoint sets of vertices $V_i$ and $V_j$ such that i) neither $V_i$ nor $V_j$ is a dominating set, ii) each vertex in $V(G) \setminus V_i$ has at most one neighbor in $V_i$ and each vertex in $V(G) \setminus V_j$ has at most one neighbor in $V_j$, and iii) $V_i \cup V_j$ is a perfect dominating set. A perfect coalition partition (abbreviated $prc$-partition) in a graph $G$ is a vertex partition $\pi= \lbrace V_1,V_2,\dots ,V_k \rbrace$ such that for each set $V_i$ of $\pi$ either $V_i$ is a singleton dominating set, or there exists a set $V_j \in \pi$ that forms a perfect coalition with $V_i$. In this paper, we initiate the study of perfect coalition partitions in graphs. We obtain a bound on the number of perfect coalitions involving each member of a perfect coalition partition, in terms of maximum degree. The perfect coalition of some special graphs are investigated. The graph $G$ with $\delta(G)=1$, the triangle-free graphs $G$ with prefect coalition number of order of $G$ and the trees $T$ with prefect coalition number in $\{n,n-1,n-2\}$ where $n=|V(T)|$ are characterized.