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

Abstract

We study the following characterization problem. Given a set T of terminals and a (2|T|-2)-dimensional vector π whose coordinates are indexed by proper subsets of T, is there a graph G that contains T, such that for all subsets ⊂neq S⊂neq T, πS equals the value of the min-cut in G separating S from T 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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