In recent years feedback set problems have been the subject of growing interest. They have found applications in many fields, including deadlock prevention, program verification, and Bayesian inference. Therefore, it is natural that in the past few years there have been intensive efforts on exact and approximation algorithms for these kinds of problems. It generalizes a number of problems, including the minimum feedback vertex (arc) set problem in both directed and undirected graphs, the subset minimum feedback vertex (arc) set problem and the graph bipartization problem, in which one must remove a minimum-weight set of vertices so that the remaining graph is bipartite. The scope of this article is to give a complete state-of-art survey of...
We propose FORTRAN subroutines for approximately solving the feedback vertex and arc set problems on...
We present a timeO(1.7548n) algorithm finding a minimum feedback vertex set in an undirected graph o...
A tournament is a directed graph T such that every pair of vertices is connected by an arc. A feedba...
In recent years feedback set problems have been the subject of growing interest. They have found app...
AbstractWe consider the feedback vertex set and feedback arc set problems on bipartite tournaments. ...
Given a weighted directed graph G = (V, A), the minimum feedback arc set problem consists of finding...
AbstractWe present improved parameterized algorithms for the feedback vertex set problem on both unw...
AbstractThe feedback vertex set problem for hypergraphs is considered and an efficient approximation...
We consider the (precedence constrained) Minimum Feedback Arc Set problem with tri-angle inequalitie...
AbstractFeedback vertex problems consist of removing a minimal number of vertices of a directed or u...
Let G be a directed graph. A vertex set F is called feedback vertex set (FVS) if its removal from G ...
ABSTRACT. We describe FORTRAN subroutines for approximately solving the feedback vertex and arc set ...
An implementation, improvements to implementation and empirical results. Feedback Vertex Set on undi...
We present a new parameterized algorithm for the feedback vertex set problem (fvs) on undirected gra...
We present a time O(1.7548n) algorithm finding a minimum feedback vertex set in an undirected graph ...
We propose FORTRAN subroutines for approximately solving the feedback vertex and arc set problems on...
We present a timeO(1.7548n) algorithm finding a minimum feedback vertex set in an undirected graph o...
A tournament is a directed graph T such that every pair of vertices is connected by an arc. A feedba...
In recent years feedback set problems have been the subject of growing interest. They have found app...
AbstractWe consider the feedback vertex set and feedback arc set problems on bipartite tournaments. ...
Given a weighted directed graph G = (V, A), the minimum feedback arc set problem consists of finding...
AbstractWe present improved parameterized algorithms for the feedback vertex set problem on both unw...
AbstractThe feedback vertex set problem for hypergraphs is considered and an efficient approximation...
We consider the (precedence constrained) Minimum Feedback Arc Set problem with tri-angle inequalitie...
AbstractFeedback vertex problems consist of removing a minimal number of vertices of a directed or u...
Let G be a directed graph. A vertex set F is called feedback vertex set (FVS) if its removal from G ...
ABSTRACT. We describe FORTRAN subroutines for approximately solving the feedback vertex and arc set ...
An implementation, improvements to implementation and empirical results. Feedback Vertex Set on undi...
We present a new parameterized algorithm for the feedback vertex set problem (fvs) on undirected gra...
We present a time O(1.7548n) algorithm finding a minimum feedback vertex set in an undirected graph ...
We propose FORTRAN subroutines for approximately solving the feedback vertex and arc set problems on...
We present a timeO(1.7548n) algorithm finding a minimum feedback vertex set in an undirected graph o...
A tournament is a directed graph T such that every pair of vertices is connected by an arc. A feedba...