AbstractWe 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 (ed...
In this paper we revisit the classical edge disjoint paths (EDP) problem, where one is given an undi...
We study the approximability of edge-disjoint paths and related problems. In the edge-disjoint paths...
The maximum edge-disjoint path problem (MEDP) is one of the most classical NP-hard problems [5]. We ...
AbstractWe study the parameterized complexity of two families of problems: the bounded length disjoi...
An L-length-bounded cut in a graph G with source s, and sink t is a cut that destroys all s-t-paths ...
This paper revisits the classical Edge Disjoint Paths (EDP) problem, where one is given an undirecte...
This paper revisits the classical edge-disjoint paths (EDP) problem, where one is given an undirecte...
A path is said to be l-bounded if it contains at most l edges. We consider two types of l-bounded di...
In PATH SET PACKING, the input is an undirected graph $G$, a collection $\cal P$ of simple paths in ...
The Minimum Length Bounded Cut problem is a natural variant of Minimum Cut: given a graph, terminal ...
In recent years, the parameterized complexity approach has lead to the introduction of many new algo...
In the bounded-degree cut problem, we are given a multigraph G=(V,E), two disjoint vertex subsets A,...
AbstractWe study the approximability of edge-disjoint paths and related problems. In the edge-disjoi...
AbstractThis paper is composed of two parts. In the first part, an improved algorithm is presented f...
AbstractThe following problem is considered: given: an undirected planar graph G=(V,E) embedded in R...
In this paper we revisit the classical edge disjoint paths (EDP) problem, where one is given an undi...
We study the approximability of edge-disjoint paths and related problems. In the edge-disjoint paths...
The maximum edge-disjoint path problem (MEDP) is one of the most classical NP-hard problems [5]. We ...
AbstractWe study the parameterized complexity of two families of problems: the bounded length disjoi...
An L-length-bounded cut in a graph G with source s, and sink t is a cut that destroys all s-t-paths ...
This paper revisits the classical Edge Disjoint Paths (EDP) problem, where one is given an undirecte...
This paper revisits the classical edge-disjoint paths (EDP) problem, where one is given an undirecte...
A path is said to be l-bounded if it contains at most l edges. We consider two types of l-bounded di...
In PATH SET PACKING, the input is an undirected graph $G$, a collection $\cal P$ of simple paths in ...
The Minimum Length Bounded Cut problem is a natural variant of Minimum Cut: given a graph, terminal ...
In recent years, the parameterized complexity approach has lead to the introduction of many new algo...
In the bounded-degree cut problem, we are given a multigraph G=(V,E), two disjoint vertex subsets A,...
AbstractWe study the approximability of edge-disjoint paths and related problems. In the edge-disjoi...
AbstractThis paper is composed of two parts. In the first part, an improved algorithm is presented f...
AbstractThe following problem is considered: given: an undirected planar graph G=(V,E) embedded in R...
In this paper we revisit the classical edge disjoint paths (EDP) problem, where one is given an undi...
We study the approximability of edge-disjoint paths and related problems. In the edge-disjoint paths...
The maximum edge-disjoint path problem (MEDP) is one of the most classical NP-hard problems [5]. We ...