Optimal Padded Decomposition For Bounded Treewidth Graphs

Abstract

A (β,δ,)-padded decomposition of an edge-weighted graph G = (V,E,w) is a stochastic decomposition into clusters of diameter at most such that for every vertex v∈ V, the probability that ballG(v,γ) is entirely contained in the cluster containing v is at least e-βγ for every γ ∈ [0,δ]. Padded decompositions have been studied for decades and have found numerous applications, including metric embedding, multicommodity flow-cut gap, multicut, and zero extension problems, to name a few. In these applications, parameter β, called the padding parameter, is the most important parameter since it decides either the distortion or the approximation ratios. For general graphs with n vertices, β = ( n). Klein, Plotkin, and Rao showed that Kr-minor-free graphs have padding parameter β = O(r3), which is a significant improvement over general graphs when r is a constant. A long-standing conjecture is to construct a padded decomposition for Kr-minor-free graphs with padding parameter β = O( r). Despite decades of research, the best-known result is β = O(r), even for graphs with treewidth at most r. In this work, we make significant progress toward the aforementioned conjecture by showing that graphs with treewidth tw admit a padded decomposition with padding parameter O( tw), which is tight. As corollaries, we obtain an exponential improvement in dependency on treewidth in a host of algorithmic applications: O( n · (tw)) flow-cut gap, max flow-min multicut ratio of O((tw)), an O((tw)) approximation for the 0-extension problem, an O( n)∞ embedding with distortion O( tw), and an O( tw) bound for integrality gap for the uniform sparsest cut.

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