Dual Half-integrality for Uncrossable Cut Cover and its Application to Maximum Half-Integral Flow
July 28, 2020 Β· Declared Dead Β· π Embedded Systems and Applications
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Authors
Naveen Garg, Nikhil Kumar
arXiv ID
2007.14156
Category
cs.DS: Data Structures & Algorithms
Citations
4
Venue
Embedded Systems and Applications
Last Checked
4 months ago
Abstract
Given an edge weighted graph and a forest $F$, the $\textit{2-edge connectivity augmentation problem}$ is to pick a minimum weighted set of edges, $E'$, such that every connected component of $E'\cup F$ is 2-edge connected. Williamson et al. gave a 2-approximation algorithm (WGMV) for this problem using the primal-dual schema. We show that when edge weights are integral, the WGMV procedure can be modified to obtain a half-integral dual. The 2-edge connectivity augmentation problem has an interesting connection to routing flow in graphs where the union of supply and demand is planar. The half-integrality of the dual leads to a tight 2-approximate max-half-integral-flow min-multicut theorem.
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