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Approximate max-integral-flow/min-multicut theorems

Published: 13 June 2004 Publication History

Abstract

We establish several approximate max-integral-flow / min-multicut theorems. While in general this ratio can be very large, we prove strong approximation ratios in the case where the min-multicut is a constant fraction ε of the total capacity of the graph. This setting is motivated by several combinatorial and algorithmic applications. Prior to this work, a general max-integral-flow / min-multicut bound was known only for the special case where the graph is a tree. We prove that, for arbitrary graphs, the max-integral-flow / min-multicut ratio is O-1 log k), where k is the number of commodites; for graphs excluding a fixed subgraph as a minor (for instance, planar graphs), O(1 / ε); and, for dense graphs, O(1√ε). Our proofs are constructive in the sense that we give efficient algorithms which compute either an integral flow achieving the claimed approximation ratios, or a witness that the precondition is violated.

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Chenyi Hu

Studying the maximum capacity between two vertices of a network has many practical applications. According to Ford and Fulkerson, the max-flow and min cut theorem is: the value of a maximum flow between two vertices is equal to the capacity of a minimum cut in a weighted graph (network). Algorithms to find the paths of the maximum flow have also been developed. The study of the maximum flow and minimum cut of a weighted graph has been active in both theoretical and application-oriented work. In this paper, the author reports on his most recent theoretical results, of bounding the approximated ratio of max-integral-flow and minimum multicuts of multicommodity flow with low-radius decompositions. The main results are: (1) The ratio of max-integral-flow and minimum multicuts, for arbitrary graphs, is O(&egr; -1log k ), where k is the number of commodities, and &egr; represents a constant fraction of the total capacity of the graph. (2) The ratio is O(1/&egr;) for graphs excluding a fixed subgraph as a minor. (3) The ratio is O(1/v&egr;) if the graph is dense. The constructive proof provides approximation algorithms that may also be used in combinatorial applications. This theoretic paper is very well written. Online Computing Reviews Service

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cover image ACM Conferences
STOC '04: Proceedings of the thirty-sixth annual ACM symposium on Theory of computing
June 2004
660 pages
ISBN:1581138520
DOI:10.1145/1007352
Permission to make digital or hard copies of all or part of this work for personal or classroom use is granted without fee provided that copies are not made or distributed for profit or commercial advantage and that copies bear this notice and the full citation on the first page. Copyrights for components of this work owned by others than ACM must be honored. Abstracting with credit is permitted. To copy otherwise, or republish, to post on servers or to redistribute to lists, requires prior specific permission and/or a fee. Request permissions from [email protected]

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Published: 13 June 2004

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STOC04: Symposium of Theory of Computing 2004
June 13 - 16, 2004
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  • (2014)Parameterized testabilityProceedings of the 5th conference on Innovations in theoretical computer science10.1145/2554797.2554843(507-516)Online publication date: 12-Jan-2014
  • (2009)Disjoint paths in sparse graphsDiscrete Applied Mathematics10.1016/j.dam.2009.03.009157:17(3558-3568)Online publication date: 1-Oct-2009
  • (2006)Edge disjoint paths in moderately connected graphsProceedings of the 33rd international conference on Automata, Languages and Programming - Volume Part I10.1007/11786986_19(202-213)Online publication date: 10-Jul-2006
  • (2005)Edge disjoint paths and max integral multiflow/min multicut theorems in planar graphsElectronic Notes in Discrete Mathematics10.1016/j.endm.2005.06.01022(55-60)Online publication date: Oct-2005
  • (undefined)Financial Performance of Government Trading Enterprises 1999-00 to 2003-04SSRN Electronic Journal10.2139/ssrn.883470

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