Independent Domination in Subcubic Graphs

TL;DR

This paper investigates the independent domination number in subcubic graphs, confirming conjectures for cubic graphs and introducing new families of graphs with maximum independent domination ratios.

Contribution

It introduces a new family of connected cubic graphs with independent domination number exactly three-eighths of their order and characterizes subcubic graphs with maximum independent domination.

Findings

New family of cubic graphs with $i(G) = rac{3}{8}n$

Bound of $i(G) \

for subcubic graphs with no isolated vertices

Abstract

A set $S$ of vertices in a graph $G$ is a dominating set if every vertex not in $S$ is adjacent to a vertex in $S$. If, in addition, $S$ is an independent set, then $S$ is an independent dominating set. The independent domination number $i(G)$ of $G$ is the minimum cardinality of an independent dominating set in $G$. In 2013 Goddard and Henning [Discrete Math 313 (2013), 839--854] conjectured that if $G$ is a connected cubic graph of order $n$, then $i(G) \le \frac{3}{8}n$, except if $G$ is the complete bipartite graph $K_{3,3}$ or the $5$-prism $C_5 \, \Box \, K_2$. Further they construct two infinite families of connected cubic graphs with independent domination three-eighths their order. They remark that perhaps it is even true that for $n > 10$ these two families are only families for which equality holds. In this paper, we provide a new family of connected cubic graphs $G$ of order $n$ such that $i(G) = \frac{3}{8}n$. We also show that if $G$ is a subcubic graph of order $n$ with no isolated vertex, then $i(G) \le \frac{1}{2}n$, and we characterize the graphs achieving equality in this bound.