Extremal Problems on Forest Cuts and Acyclic Neighborhoods in Sparse Graphs
Abstract
Chernyshev, Rauch, and Rautenbach proved that every connected graph on n vertices with less than 115n-185 edges has a vertex cut that induces a forest, and conjectured that the same remains true if the graph has less than 3n-6 edges. We improve their result by proving that every connected graph on n vertices with less than 94n edges has a vertex cut that induces a forest. We also study weaker versions of the problem that might lead to an improvement on the bound obtained.
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