Eun-Kyung Cho, Jinha Kim, Minki Kim, Sang-il Oum
Published 2022-02-19, updated 2022-10-25Version 2
An independent dominating set of a graph, also known as a maximal independent set, is a set $S$ of pairwise non-adjacent vertices such that every vertex not in $S$ is adjacent to some vertex in $S$. We prove that for $\Delta=4$ or $\Delta\ge 6$, every connected $n$-vertex graph of maximum degree at most $\Delta$ has an independent dominating set of size at most $(1-\frac{\Delta}{\lfloor\Delta^2/4\rfloor+\Delta})(n-1)+1$. In addition, we characterize all connected graphs having the equality and we show that other connected graphs have an independent dominating set of size at most $(1-\frac{\Delta}{ \lfloor\Delta^2/4\rfloor+\Delta})n$.
Independent Domination in Directed Graphs
Complexes of connected graphs
Random graphs with bounded maximum degree: asymptotic structure and a logical limit law
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