Number of Edges in 3-Connected Graphs with Cyclic Neighborhoods

Abstract

Chernyshev, Rauch and Rautenbach [Discrete Math., 2025] introduce forest cuts, i.e., vertex separators that induce a forest. They conjecture that, similar to a result by Chen and Yu [Discrete Math., 2002], every n-vertex graph with less than 3n-6 edges has a forest cut. As an intermediate goal they ask how many edges an n-vertex 3-connected graph must have such that the neighborhood of every vertex contains a cycle. Li, Tang and Zhan [arXiv, 2024] resolve this problem by showing that every such graph has at least 15n/8 edges, while there are examples of such graphs with exactly 15n/8 edges. We give a much shorter proof for this.

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