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Extensions and limits to vertex sparsification

Authors:

F. Thomson Leighton,

Ankur MoitraAuthors Info & Claims

STOC '10: Proceedings of the forty-second ACM symposium on Theory of computing

Pages 47 - 56

https://doi.org/10.1145/1806689.1806698

Published: 05 June 2010 Publication History

Abstract

Suppose we are given a graph G = (V, E) and a set of terminals K ⊂ V. We consider the problem of constructing a graph H = (K, E_H) that approximately preserves the congestion of every multicommodity flow with endpoints supported in K. We refer to such a graph as a flow sparsifier. We prove that there exist flow sparsifiers that simultaneously preserve the congestion of all multicommodity flows within an O(log k / log log k)-factor where |K| = k. This bound improves to O(1) if G excludes any fixed minor. This is a strengthening of previous results, which consider the problem of finding a graph H = (K, E_H) (a cut sparsifier) that approximately preserves the value of minimum cuts separating any partition of the terminals. Indirectly our result also allows us to give a construction for better quality cut sparsifiers (and flow sparsifiers). Thereby, we immediately improve all approximation ratios derived using vertex sparsification in [14].

We also prove an Ω(log log k) lower bound for how well a flow sparsifier can simultaneously approximate the congestion of every multicommodity flow in the original graph. The proof of this theorem relies on a technique (which we refer to as oblivious dual certifcates) for proving super-constant congestion lower bounds against many multicommodity flows at once. Our result implies that approximation algorithms for multicommodity flow-type problems designed by a black box reduction to a "uniform" case on k nodes (see [14] for examples) must incur a super-constant cost in the approximation ratio.

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Cited By

Filtser A(2024)Scattering and Sparse Partitions, and Their ApplicationsACM Transactions on Algorithms10.1145/367256220:4(1-42)Online publication date: 5-Aug-2024
https://dl.acm.org/doi/10.1145/3672562
Pelleg EŽivný S(2023)Additive Sparsification of CSPsACM Transactions on Algorithms10.1145/362582420:1(1-18)Online publication date: 13-Nov-2023
https://dl.acm.org/doi/10.1145/3625824
Bläsius TFreiberger CFriedrich TKatzmann MMontenegro-Retana FThieffry M(2022)Efficient Shortest Paths in Scale-Free Networks with Underlying Hyperbolic GeometryACM Transactions on Algorithms10.1145/351648318:2(1-32)Online publication date: 30-Mar-2022
https://dl.acm.org/doi/10.1145/3516483
Show More Cited By

Index Terms

Extensions and limits to vertex sparsification
1. Mathematics of computing
  1. Discrete mathematics
    1. Graph theory
      1. Graph algorithms
      2. Network flows
2. Theory of computation
  1. Design and analysis of algorithms
    1. Graph algorithms analysis
      1. Network flows

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cover image ACM Conferences

STOC '10: Proceedings of the forty-second ACM symposium on Theory of computing

June 2010

812 pages

ISBN:9781450300506

DOI:10.1145/1806689

General Chair:
Michael Mitzenmacher
Harvard
,
Program Chair:
Leonard J. Schulman
Caltech

Copyright © 2010 ACM.

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Published: 05 June 2010

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June 5 - 8, 2010

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Cited By

Filtser A(2024)Scattering and Sparse Partitions, and Their ApplicationsACM Transactions on Algorithms10.1145/367256220:4(1-42)Online publication date: 5-Aug-2024
https://dl.acm.org/doi/10.1145/3672562
Pelleg EŽivný S(2023)Additive Sparsification of CSPsACM Transactions on Algorithms10.1145/362582420:1(1-18)Online publication date: 13-Nov-2023
https://dl.acm.org/doi/10.1145/3625824
Bläsius TFreiberger CFriedrich TKatzmann MMontenegro-Retana FThieffry M(2022)Efficient Shortest Paths in Scale-Free Networks with Underlying Hyperbolic GeometryACM Transactions on Algorithms10.1145/351648318:2(1-32)Online publication date: 30-Mar-2022
https://dl.acm.org/doi/10.1145/3516483
Charalampopoulos PMozes STebeka B(2022)Exact Distance Oracles for Planar Graphs with Failing VerticesACM Transactions on Algorithms10.1145/351154118:2(1-23)Online publication date: 30-Mar-2022
https://dl.acm.org/doi/10.1145/3511541
Cygan MNederlof JPilipczuk MPilipczuk MVan Rooij JWojtaszczyk J(2022)Solving Connectivity Problems Parameterized by Treewidth in Single Exponential TimeACM Transactions on Algorithms10.1145/350670718:2(1-31)Online publication date: 4-Mar-2022
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Henzinger MPeng P(2022)Constant-time Dynamic (Δ +1)-ColoringACM Transactions on Algorithms10.1145/350140318:2(1-21)Online publication date: 4-Mar-2022
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Wahlström M(2022)Quasipolynomial Multicut-mimicking Networks and Kernels for Multiway Cut ProblemsACM Transactions on Algorithms10.1145/350130418:2(1-19)Online publication date: 4-Mar-2022
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Forster SGoranci GLiu YPeng RSun XYe M(2022)Minor Sparsifiers and the Distributed Laplacian Paradigm2021 IEEE 62nd Annual Symposium on Foundations of Computer Science (FOCS)10.1109/FOCS52979.2021.00099(989-999)Online publication date: Feb-2022
https://doi.org/10.1109/FOCS52979.2021.00099
Chalermsook PDas SKook YLaekhanukit BLiu YPeng RSellke MVaz DMarx D(2021)Vertex sparsification for edge connectivityProceedings of the Thirty-Second Annual ACM-SIAM Symposium on Discrete Algorithms10.5555/3458064.3458138(1206-1225)Online publication date: 10-Jan-2021
https://dl.acm.org/doi/10.5555/3458064.3458138
Zhou ZXu AYatani K(2021)SyncUpProceedings of the ACM on Interactive, Mobile, Wearable and Ubiquitous Technologies10.1145/34781205:3(1-25)Online publication date: 14-Sep-2021
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