AbstractGiven a number of requests ℓ, we propose a polynomial-time algorithm for finding ℓ disjoint paths in a symmetric directed graph. It is known that the problem of finding ℓ≥2 disjoint paths in a directed graph is NP-hard [S. Fortune, J. Hopcroft, J. Wyllie, The directed subgraph homeomorphism problem, Journal of Theoretical Computer Science 10 (2) (1980) 111–121]. However, by studying minimal solutions it turns out that only a finite number of configurations are possible in a symmetric digraph. We use Robertson and Seymour’s polynomial-time algorithm [N. Robertson, P. D. Seymour, Graph minors xiii. The disjoint paths problem, Journal of Combinatorial Theory B (63) (1995) 65–110] to check the feasibility of each configuration
We give an $NC$ algorithm for finding vertex disjoint $s_{1}, t_{1}$ and $s_{2}, t_{2}$ paths in an...
Abstract. We study the Edge Disjoint Paths (EDP) problem in undi-rected graphs: Given a graph G with...
Given an undirected graph and two pairs of vertices $(s_i,t_i)$ for $i\in\{1,2\}$ we show that there...
AbstractGiven a number of requests ℓ, we propose a polynomial-time algorithm for finding ℓ disjoint ...
Given k pairs of vertices (si, ti) (1≤i≤k) of a digraph G, how can we test whether there exist k ver...
Given k pairs of vertices (si,ti) (1 ≤ i ≤ k) of a digraph G, how can we test whether there exist ve...
A digraph H is infused in a digraph G if the vertices of H are mapped to vertices of G (not necessar...
AbstractAs an extension of the disjoint paths problem, we introduce a new problem which we call the ...
AbstractWe describe an algorithm, which for fixed k ≥ 0 has running time O(|V(G)|3), to solve the fo...
Abstract. Given an acyclic directed graph and two distinct nodes s and t, we consider the problem of...
Given k+1 pairs of vertices (s_1,s_2),(u_1,v_1),...,(u_k,v_k) of a directed acyclic graph, we show t...
AbstractWe show that the following problem is NP-complete: Given a digraph D and distinct vertices s...
Finding a shortest path in a graph is at the core of many combinatorial search problems. A closely r...
The well-known Disjoint Paths problem is to decide if a graph contains k pairwise disjoint paths, e...
International audienceIn the Directed Disjoint Paths problem, we are given a digraph D and a set of ...
We give an $NC$ algorithm for finding vertex disjoint $s_{1}, t_{1}$ and $s_{2}, t_{2}$ paths in an...
Abstract. We study the Edge Disjoint Paths (EDP) problem in undi-rected graphs: Given a graph G with...
Given an undirected graph and two pairs of vertices $(s_i,t_i)$ for $i\in\{1,2\}$ we show that there...
AbstractGiven a number of requests ℓ, we propose a polynomial-time algorithm for finding ℓ disjoint ...
Given k pairs of vertices (si, ti) (1≤i≤k) of a digraph G, how can we test whether there exist k ver...
Given k pairs of vertices (si,ti) (1 ≤ i ≤ k) of a digraph G, how can we test whether there exist ve...
A digraph H is infused in a digraph G if the vertices of H are mapped to vertices of G (not necessar...
AbstractAs an extension of the disjoint paths problem, we introduce a new problem which we call the ...
AbstractWe describe an algorithm, which for fixed k ≥ 0 has running time O(|V(G)|3), to solve the fo...
Abstract. Given an acyclic directed graph and two distinct nodes s and t, we consider the problem of...
Given k+1 pairs of vertices (s_1,s_2),(u_1,v_1),...,(u_k,v_k) of a directed acyclic graph, we show t...
AbstractWe show that the following problem is NP-complete: Given a digraph D and distinct vertices s...
Finding a shortest path in a graph is at the core of many combinatorial search problems. A closely r...
The well-known Disjoint Paths problem is to decide if a graph contains k pairwise disjoint paths, e...
International audienceIn the Directed Disjoint Paths problem, we are given a digraph D and a set of ...
We give an $NC$ algorithm for finding vertex disjoint $s_{1}, t_{1}$ and $s_{2}, t_{2}$ paths in an...
Abstract. We study the Edge Disjoint Paths (EDP) problem in undi-rected graphs: Given a graph G with...
Given an undirected graph and two pairs of vertices $(s_i,t_i)$ for $i\in\{1,2\}$ we show that there...