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On the isolation number of graphs with minimum degree four

Published 29 Aug 2025 in math.CO | (2508.21551v1)

Abstract: An isolating set in a graph $G$ is a set $S$ of vertices such that removing $S$ and its neighborhood leaves no edge. The isolation number $\iota(G)$ of $G$ (also known as the vertex-edge domination number) is the minimum size among all isolating sets of $G$. We provide a technique for proving upper bounds on this parameter for graphs with a given minimum degree. For example, we show that if $G$ has order~$n$ and minimum degree at least~$4$, then $\iota(G) \le 13n/41$, and if $G$ is also triangle-free, then $\iota(G) \le 3n/10$.

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