article

A parameterized view on matroid optimization problems

Author:

Dániel MarxAuthors Info & Claims

Theoretical Computer Science, Volume 410, Issue 44

Pages 4471 - 4479

https://doi.org/10.1016/j.tcs.2009.07.027

Published: 01 October 2009 Publication History

Abstract

Matroid theory gives us powerful techniques for understanding combinatorial optimization problems and for designing polynomial-time algorithms. However, several natural matroid problems, such as 3-matroid intersection, are NP-hard. Here we investigate these problems from the parameterized complexity point of view: instead of the trivial n^O^(^k^) time brute force algorithm for finding a k-element solution, we try to give algorithms with uniformly polynomial (i.e., f(k)@?n^O^(^1^)) running time. The main result is that if the ground set of a represented linear matroid is partitioned into blocks of size @?, then we can determine in randomized time f(k,@?)@?n^O^(^1^) whether there is an independent set that is the union of k blocks. As a consequence, algorithms with similar running time are obtained for other problems such as finding a k-element set in the intersection of @? matroids, or finding k terminals in a network such that each of them can be connected simultaneously to the source by @? disjoint paths.

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A parameterized view on matroid optimization problems
1. Mathematics of computing
  1. Discrete mathematics
    1. Combinatorics
2. Theory of computation

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cover image Theoretical Computer Science

Theoretical Computer Science Volume 410, Issue 44

October, 2009

88 pages

ISSN:0304-3975

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Copyright © Elsevier B.V. © 2009.

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Elsevier Science Publishers Ltd.

United Kingdom

Publication History

Published: 01 October 2009

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Cited By

Zehavi M(2023)Forgetfulness Can Make You Faster: An (8.097)-time Algorithm for Weighted 3-set -packingACM Transactions on Computation Theory10.1145/359972215:3-4(1-13)Online publication date: 16-Aug-2023
https://dl.acm.org/doi/10.1145/3599722
Agrawal ALokshtanov DMisra PSaurabh SZehavi M(2023)Polynomial Kernel for Interval Vertex DeletionACM Transactions on Algorithms10.1145/357107519:2(1-68)Online publication date: 15-Apr-2023
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