Approximate Max-Flow Min-Multicut Theorem for Graphs of Bounded Treewidth

November 11, 2022 Β· Declared Dead Β· πŸ› Symposium on the Theory of Computing

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Authors Tobias Friedrich, Davis Issac, Nikhil Kumar, Nadym Mallek, Ziena Zeif arXiv ID 2211.06267 Category cs.DS: Data Structures & Algorithms Cross-listed cs.DM Citations 7 Venue Symposium on the Theory of Computing Last Checked 4 months ago
Abstract
We prove an approximate max-multiflow min-multicut theorem for bounded treewidth graphs. In particular, we show the following: Given a treewidth-$r$ graph, there exists a (fractional) multicommodity flow of value $f$, and a multicut of capacity $c$ such that $ f \leq c \leq \mathcal{O}(\ln (r+1)) \cdot f$. It is well known that the multiflow-multicut gap on an $r$-vertex (constant degree) expander graph can be $Ξ©(\ln r)$, and hence our result is tight up to constant factors. Our proof is constructive, and we also obtain a polynomial time $\mathcal{O}(\ln (r+1))$-approximation algorithm for the minimum multicut problem on treewidth-$r$ graphs. Our algorithm proceeds by rounding the optimal fractional solution to the natural linear programming relaxation of the multicut problem. We introduce novel modifications to the well-known region growing algorithm to facilitate the rounding while guaranteeing at most a logarithmic factor loss in the treewidth.
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