Finding $d$-Cuts in Probe $H$-Free Graphs

May 28, 2025 Β· Declared Dead Β· πŸ› International Symposium on Fundamentals of Computation Theory

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Authors Konrad K. Dabrowski, Tala Eagling-Vose, Matthew Johnson, Giacomo Paesani, DaniΓ«l Paulusma arXiv ID 2505.22351 Category cs.DS: Data Structures & Algorithms Cross-listed cs.CC, cs.DM, math.CO Citations 1 Venue International Symposium on Fundamentals of Computation Theory Last Checked 4 months ago
Abstract
For an integer $d\geq 1$, the $d$-Cut problem is that of deciding whether a graph has an edge cut in which each vertex is adjacent to at most $d$ vertices on the opposite side of the cut. The $1$-Cut problem is the well-known Matching Cut problem. The $d$-Cut problem has been extensively studied for $H$-free graphs. We extend these results to the probe graph model, where we do not know all the edges of the input graph. For a graph $H$, a partitioned probe $H$-free graph $(G,P,N)$ consists of a graph $G=(V,E)$, together with a set $P\subseteq V$ of probes and an independent set $N=V\setminus P$ of non-probes such that we can change $G$ into an $H$-free graph by adding zero or more edges between vertices in $N$. For every graph $H$ and every integer $d\geq 1$, we completely determine the complexity of $d$-Cut on partitioned probe $H$-free graphs.
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