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IWPEC
2009
Springer

Paths of Bounded Length and Their Cuts: Parameterized Complexity and Algorithms

14 years 7 months ago
Paths of Bounded Length and Their Cuts: Parameterized Complexity and Algorithms
We study the parameterized complexity of two families of problems: the bounded length disjoint paths problem and the bounded length cut problem. From Menger’s theorem both problems are equivalent (and computationally easy) in the unbounded case for single source, single target paths. However, in the bounded case, they are combinatorially distinct and are both NP-hard, even to approximate. Our results indicate that a more refined landscape appears when we study these problems with respect to their parameterized complexity. For this, we consider several parameterizations (with respect to the maximum length l of paths, the number k of paths or the size of a cut, and the treewidth of the input graph) of all variants of both problems (edge/vertex-disjoint paths or cuts, directed/undirected). We provide FPT-algorithms (for all variants) when parameterized by both k and l and hardness results when the parameter is only one of k and l. Our results indicate that the bounded length disjoint-p...
Petr A. Golovach, Dimitrios M. Thilikos
Added 27 May 2010
Updated 27 May 2010
Type Conference
Year 2009
Where IWPEC
Authors Petr A. Golovach, Dimitrios M. Thilikos
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