Add to ORKGWe study in this paper the problem of finding in a graph a subset of k edges whose deletion causes the largest increase in the weight of a minimum spanning tree. We propose for this problem an explicit enumeration algorithm whose complexity, when compared to the current best algorithm, is better for general k but very slightly worse for fixed k. More interestingly, unlike in the previous algorithms, we can easily adapt our algorithm so as to transform it into an implicit exploration algorithm based on a branch and bound scheme. We also propose a mixed integer programming formulation for this problem. Computational results show a clear superiority of the implicit enumeration algorithm both over the explicit enumeration algorithm and the mixe...
The minimum-weight spanning tree problem is one of the most typical and well-known problems of combi...
In an undirected graph G we associate costs and weights to each edge. The weight-constrained minimum...
AbstractThe minimal spanning tree problem is a popular problem of discrete optimization. Numerous al...
We study in this paper the problem of finding in a graph a subset of k edges whose deletion causes t...
For a connected, undirected and weighted graph G = (V; E), the problem of finding the k most vital ...
Assume that G(V,E) is a weighted, undirected, connected graph with n vertices. The k most vital edge...
AbstractAssume that G(V,E) is a weighted, undirected, connected graph with n vertices. The k most vi...
[[abstract]]Let G(N; A) be a connected, undirected and weighted network with node set N and edge set...
Let G be a connected, undirected and weighted graph with n vertices and m edges. A most vital edge o...
[[abstract]]In many applications, the network designer may want to know which edges in the network a...
We present a simple new algorithm for computing minimum spanning trees that is more than two times f...
Abstract: An edge-ranking of a graph G is a labeling of its edges with positive integers such that e...
The problem of finding the minimal spanning tree on an undirected weighted graph has been investigat...
The minimal spanning tree problem is one of the oldest and most basic graph problems in theoretical ...
AbstractThe problem of finding the minimal spanning tree on an undirected weighted graph has been in...
The minimum-weight spanning tree problem is one of the most typical and well-known problems of combi...
In an undirected graph G we associate costs and weights to each edge. The weight-constrained minimum...
AbstractThe minimal spanning tree problem is a popular problem of discrete optimization. Numerous al...
We study in this paper the problem of finding in a graph a subset of k edges whose deletion causes t...
For a connected, undirected and weighted graph G = (V; E), the problem of finding the k most vital ...
Assume that G(V,E) is a weighted, undirected, connected graph with n vertices. The k most vital edge...
AbstractAssume that G(V,E) is a weighted, undirected, connected graph with n vertices. The k most vi...
[[abstract]]Let G(N; A) be a connected, undirected and weighted network with node set N and edge set...
Let G be a connected, undirected and weighted graph with n vertices and m edges. A most vital edge o...
[[abstract]]In many applications, the network designer may want to know which edges in the network a...
We present a simple new algorithm for computing minimum spanning trees that is more than two times f...
Abstract: An edge-ranking of a graph G is a labeling of its edges with positive integers such that e...
The problem of finding the minimal spanning tree on an undirected weighted graph has been investigat...
The minimal spanning tree problem is one of the oldest and most basic graph problems in theoretical ...
AbstractThe problem of finding the minimal spanning tree on an undirected weighted graph has been in...
The minimum-weight spanning tree problem is one of the most typical and well-known problems of combi...
In an undirected graph G we associate costs and weights to each edge. The weight-constrained minimum...
AbstractThe minimal spanning tree problem is a popular problem of discrete optimization. Numerous al...