The work conducted in this thesis is focused on the minimum spanning problems in graphs under constraints on the vertex degrees. As the spanning tree covers the vertices of a connected graph with a minimum number of links, it is generally proposed as a solution for this kind of problems. However, for some applications such as the routing in optical networks, the solution is not necessarily a sub-graph. In this thesis, we assume that the degree constraints are due to a limited instantaneous capacity of the vertices and that the only pertinent requirement on the spanning structure is its connectivity. In that case, the solution may be different from a tree. We propose the reformulation of this kind of spanning problems. To find the optimal co...
: We consider the problem of constructing a spanning tree for a graph G = (V, E) with n vertices an...
Given a connected graph with edge costs, we seek a spanning tree having a specified degree at one ve...
Abstract In this paper we take into account three different spanning tree problems with degree-depen...
Le travail que nous développons dans le cadre de cette thèse s'articule autour des problèmes de rech...
International audienceGiven a connected edge-weighted graph G and a positive integer B, the degree-c...
Degree constrained spanning tree problems are known and deeply analyzed when the graph nodes are pro...
The problem of minimal cost partial spanning trees is well known as the NP-complete Steiner problem ...
Given a connected graph G, a vertex v of G is said to be a branch vertex if its degree is greater th...
International audienceA vertex v of a connected graph G = (V, E) is called a branch vertex if its de...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
A network is a system that involves movement or flow of some commodities such as goods and services....
We introduce the following combinatorial optimization problem: Given a connected graph G, find a spa...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
Cette thèse porte sur différents problèmes d'optimisation combinatoire dont nous avons caractérisé l...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each ve...
: We consider the problem of constructing a spanning tree for a graph G = (V, E) with n vertices an...
Given a connected graph with edge costs, we seek a spanning tree having a specified degree at one ve...
Abstract In this paper we take into account three different spanning tree problems with degree-depen...
Le travail que nous développons dans le cadre de cette thèse s'articule autour des problèmes de rech...
International audienceGiven a connected edge-weighted graph G and a positive integer B, the degree-c...
Degree constrained spanning tree problems are known and deeply analyzed when the graph nodes are pro...
The problem of minimal cost partial spanning trees is well known as the NP-complete Steiner problem ...
Given a connected graph G, a vertex v of G is said to be a branch vertex if its degree is greater th...
International audienceA vertex v of a connected graph G = (V, E) is called a branch vertex if its de...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
A network is a system that involves movement or flow of some commodities such as goods and services....
We introduce the following combinatorial optimization problem: Given a connected graph G, find a spa...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
Cette thèse porte sur différents problèmes d'optimisation combinatoire dont nous avons caractérisé l...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each ve...
: We consider the problem of constructing a spanning tree for a graph G = (V, E) with n vertices an...
Given a connected graph with edge costs, we seek a spanning tree having a specified degree at one ve...
Abstract In this paper we take into account three different spanning tree problems with degree-depen...