Add to ORKGWe show that generating all negative cycles of a weighted graph is a hard enumeration problem, in both the directed and undirected cases. More precisely, given a family of negative (directed) cycles, it is an NP-complete problem to decide whether this family can be extended or there are no other negative (directed) cycles in the graph, implying that (directed) negative cycles cannot be generated in polynomial output time, unless P=NP. As a corollary, we solve in the negative two well-known generating problems from linear programming: (i) Given an infeasible system of linear inequalities, generating all minimal infeasible subsystems is hard. Yet, for generating maximal feasible subsystems the complexity remains open. (ii) Given a feasible sy...
Clique-width is a graph parameter that measures in a certain sense the complexity of a graph. Hard g...
Vertex and edge colorability are two graph problems that are NP-hard in general. We show that both p...
This paper outlines the results and motivation of the paper [I], in which we showed, in a ur&.?‘...
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...
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...
In this paper, we discuss the computational complexity of the following enumeration problem: Given a...
We present here an algorithm for detecting (and outputting, if exists) a negative cycle in an $n$-ve...
AbstractGiven a directed graph where edges are associated with weights which are not necessarily pos...
AbstractIn this paper, we discuss the computational complexity of the following enumeration problem:...
International audienceIt is a long-standing open problem whether the minimal dominating sets of a gr...
In this paper, we investigate the applicability of backtrack technique to solve the vertex enumerati...
Vertex Enumeration Algorithms explore the methods and procedures of generating the vertices of gener...
AbstractIn this paper, we investigate the applicability of backtrack technique to solve the vertex e...
Clique-width is a graph parameter that measures in a certain sense the complexity of a graph. Hard g...
Vertex and edge colorability are two graph problems that are NP-hard in general. We show that both p...
This paper outlines the results and motivation of the paper [I], in which we showed, in a ur&.?‘...
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...
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...
In this paper, we discuss the computational complexity of the following enumeration problem: Given a...
We present here an algorithm for detecting (and outputting, if exists) a negative cycle in an $n$-ve...
AbstractGiven a directed graph where edges are associated with weights which are not necessarily pos...
AbstractIn this paper, we discuss the computational complexity of the following enumeration problem:...
International audienceIt is a long-standing open problem whether the minimal dominating sets of a gr...
In this paper, we investigate the applicability of backtrack technique to solve the vertex enumerati...
Vertex Enumeration Algorithms explore the methods and procedures of generating the vertices of gener...
AbstractIn this paper, we investigate the applicability of backtrack technique to solve the vertex e...
Clique-width is a graph parameter that measures in a certain sense the complexity of a graph. Hard g...
Vertex and edge colorability are two graph problems that are NP-hard in general. We show that both p...
This paper outlines the results and motivation of the paper [I], in which we showed, in a ur&.?‘...