Add to ORKGGiven a graph $G=(V,E)$ and a weight function on the edges $w:E\mapsto\RR$, we consider the polyhedron $P(G,w)$ of negative-weight flows on $G$, and get a complete characterization of the vertices and extreme directions of $P(G,w)$. As a corollary, we show that, unless $P=NP$, there is no output polynomial-time algorithm to generate all the vertices of a 0/1-polyhedron. This strengthens the NP-hardness result of Khachiyan et al. (2006) for non 0/1-polyhedra, and comes in contrast with the polynomiality of vertex enumeration for 0/1-polytopes \cite{BL98} [Bussieck and L\"ubbecke (1998)]
For an undirected graph G¿=¿(V,E), we say that for l,u,v¿¿¿V, l separates u from v if the distance b...
AbstractGiven an undirected graph G and a cost associated with each edge, the weighted girth problem...
A minus clique-transversal function of a graph G = (V, E) is a function f : V → {- 1, 0, 1} such tha...
Given a graph G = (V,E) and a weight function on the edges w: E 7→ R, we consider the polyhedron P (...
Given a graph $G=(V,E)$ and a weight function on the edges $w:E\mapsto\RR$, we consider the polyhedr...
We show that generating all negative cycles of a weighted graph is a hard enumeration problem, in bo...
We show that generating all negative cycles of a weighted graph is a hard enumeration problem, in bo...
In this paper, we discuss the computational complexity of the following enumeration problem: Given a...
A number of results in hamiltonian graph theory are of the form P1 implies P2, where P1 is a propert...
We present here an algorithm for detecting (and outputting, if exists) a negative cycle in an $n$-ve...
AbstractLet G= (VG, EG) and H= (VH, EH) be two undirected graphs, and VH ⊆ VG. We associate with G a...
AbstractA number of results in hamiltonian graph theory are of the form “P1 implies P2”, where P1 is...
Vertex Enumeration Algorithms explore the methods and procedures of generating the vertices of gener...
We give an incremental polynomial time algorithm for enumerating the vertices of any polyhedron P=P(...
AbstractGiven a directed graph where edges are associated with weights which are not necessarily pos...
For an undirected graph G¿=¿(V,E), we say that for l,u,v¿¿¿V, l separates u from v if the distance b...
AbstractGiven an undirected graph G and a cost associated with each edge, the weighted girth problem...
A minus clique-transversal function of a graph G = (V, E) is a function f : V → {- 1, 0, 1} such tha...
Given a graph G = (V,E) and a weight function on the edges w: E 7→ R, we consider the polyhedron P (...
Given a graph $G=(V,E)$ and a weight function on the edges $w:E\mapsto\RR$, we consider the polyhedr...
We show that generating all negative cycles of a weighted graph is a hard enumeration problem, in bo...
We show that generating all negative cycles of a weighted graph is a hard enumeration problem, in bo...
In this paper, we discuss the computational complexity of the following enumeration problem: Given a...
A number of results in hamiltonian graph theory are of the form P1 implies P2, where P1 is a propert...
We present here an algorithm for detecting (and outputting, if exists) a negative cycle in an $n$-ve...
AbstractLet G= (VG, EG) and H= (VH, EH) be two undirected graphs, and VH ⊆ VG. We associate with G a...
AbstractA number of results in hamiltonian graph theory are of the form “P1 implies P2”, where P1 is...
Vertex Enumeration Algorithms explore the methods and procedures of generating the vertices of gener...
We give an incremental polynomial time algorithm for enumerating the vertices of any polyhedron P=P(...
AbstractGiven a directed graph where edges are associated with weights which are not necessarily pos...
For an undirected graph G¿=¿(V,E), we say that for l,u,v¿¿¿V, l separates u from v if the distance b...
AbstractGiven an undirected graph G and a cost associated with each edge, the weighted girth problem...
A minus clique-transversal function of a graph G = (V, E) is a function f : V → {- 1, 0, 1} such tha...