Towards the Characterization of Terminal Cut Functions: a Condition for Laminar Families

October 17, 2023 Β· Declared Dead Β· πŸ› arXiv.org

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Authors Yu Chen, Zihan Tan arXiv ID 2310.11367 Category cs.DS: Data Structures & Algorithms Cross-listed cs.DM, math.CO Citations 1 Venue arXiv.org Last Checked 4 months ago
Abstract
We study the following characterization problem. Given a set $T$ of terminals and a $(2^{|T|}-2)$-dimensional vector $Ο€$ whose coordinates are indexed by proper subsets of $T$, is there a graph $G$ that contains $T$, such that for all subsets $\emptyset\subsetneq S\subsetneq T$, $Ο€_S$ equals the value of the min-cut in $G$ separating $S$ from $T\setminus S$? The only known necessary conditions are submodularity and a special class of linear inequalities given by Chaudhuri, Subrahmanyam, Wagner and Zaroliagis. Our main result is a new class of linear inequalities concerning laminar families, that generalize all previous ones. Using our new class of inequalities, we can generalize Karger's approximate min-cut counting result to graphs with terminals.
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