Add to ORKGWe present a survey about the maximum integral multiflow and minimum multicut problems and their subproblems, such as the multiterminal cut and the unsplittable flow problems. We consider neither continuous multiflow nor minimum cost multiflow. Most of the results are very recent and some are new. We recall the dual relationship between both problems, give complexity results and algorithms, firstly in unrestricted graphs and secondly in several special graphs: trees, bipartite or planar graphs. A table summarizes the most important results
National audienceWe generalize all the results obtained for trees in [N. Garg, V. Vazirani, M. Yanna...
We study the multicut and the sparsest cut problems in directed graphs. In the multicut problem, we ...
AbstractWe consider the undirected maximum multiflow (multicommodity flow) problem in the case when ...
noteWe present a survey about the maximum integral multiflow and minimum multicut problems and their...
Rapport CEDRICConsider a graph G=(V,E) with n vertices, medges and a positive weight (or capacity) o...
Dans cette thèse, on s'intéresse à des problèmes de multiflot entier et de multicoupe, qui généralis...
In this paper, we study the problem of finding an integral multiflow which maximizes the sum of flow...
We study the problem of multicommodity flow and multicut in treewidth-2 graphs and prove bounds on t...
AbstractWe generalize all the results obtained for maximum integer multiflow and minimum multicut pr...
We study the maximum integral multicommodity flow problem and the minimum multicut problem restricte...
We generalize all the results obtained for integer multiflow andmulticut problems in trees by Garg e...
We compare two multicommodity flow problems, the maximum sum of flow, and the maximum concurrent flo...
In this paper we consider the worst case ratio between the capacity of min-cuts and the value of max...
AbstractThe paper has two parts. In the algorithmic part integer inequality systems of packing types...
AbstractThe paper has two parts. In the algorithmic part integer inequality systems of packing types...
National audienceWe generalize all the results obtained for trees in [N. Garg, V. Vazirani, M. Yanna...
We study the multicut and the sparsest cut problems in directed graphs. In the multicut problem, we ...
AbstractWe consider the undirected maximum multiflow (multicommodity flow) problem in the case when ...
noteWe present a survey about the maximum integral multiflow and minimum multicut problems and their...
Rapport CEDRICConsider a graph G=(V,E) with n vertices, medges and a positive weight (or capacity) o...
Dans cette thèse, on s'intéresse à des problèmes de multiflot entier et de multicoupe, qui généralis...
In this paper, we study the problem of finding an integral multiflow which maximizes the sum of flow...
We study the problem of multicommodity flow and multicut in treewidth-2 graphs and prove bounds on t...
AbstractWe generalize all the results obtained for maximum integer multiflow and minimum multicut pr...
We study the maximum integral multicommodity flow problem and the minimum multicut problem restricte...
We generalize all the results obtained for integer multiflow andmulticut problems in trees by Garg e...
We compare two multicommodity flow problems, the maximum sum of flow, and the maximum concurrent flo...
In this paper we consider the worst case ratio between the capacity of min-cuts and the value of max...
AbstractThe paper has two parts. In the algorithmic part integer inequality systems of packing types...
AbstractThe paper has two parts. In the algorithmic part integer inequality systems of packing types...
National audienceWe generalize all the results obtained for trees in [N. Garg, V. Vazirani, M. Yanna...
We study the multicut and the sparsest cut problems in directed graphs. In the multicut problem, we ...
AbstractWe consider the undirected maximum multiflow (multicommodity flow) problem in the case when ...