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Electrical Flows, Laplacian Systems, and Faster Approximation of Maximum Flow in Undirected Graphs

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arxiv 1010.2921 v2 pith:HT5T6YZW submitted 2010-10-14 cs.DS cs.CC

Electrical Flows, Laplacian Systems, and Faster Approximation of Maximum Flow in Undirected Graphs

classification cs.DS cs.CC
keywords approximatelyflowepsilonmaximumtimealgorithmtildeapproach
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We introduce a new approach to computing an approximately maximum s-t flow in a capacitated, undirected graph. This flow is computed by solving a sequence of electrical flow problems. Each electrical flow is given by the solution of a system of linear equations in a Laplacian matrix, and thus may be approximately computed in nearly-linear time. Using this approach, we develop the fastest known algorithm for computing approximately maximum s-t flows. For a graph having n vertices and m edges, our algorithm computes a (1-\epsilon)-approximately maximum s-t flow in time \tilde{O}(mn^{1/3} \epsilon^{-11/3}). A dual version of our approach computes a (1+\epsilon)-approximately minimum s-t cut in time \tilde{O}(m+n^{4/3}\eps^{-8/3}), which is the fastest known algorithm for this problem as well. Previously, the best dependence on m and n was achieved by the algorithm of Goldberg and Rao (J. ACM 1998), which can be used to compute approximately maximum s-t flows in time \tilde{O}(m\sqrt{n}\epsilon^{-1}), and approximately minimum s-t cuts in time \tilde{O}(m+n^{3/2}\epsilon^{-3}).

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Cited by 1 Pith paper

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  1. Flows in Almost Linear Time via Adaptive Preconditioning

    cs.DS 2019-06 unverdicted novelty 7.0

    Algorithms achieve almost-linear time for ℓ_p-norm flow and dual regression problems on unit-weighted graphs for a range of p, plus applications to max-flow and total variation.