Add to ORKGFor the separable convex cost flow problem, we consider the problem of determining tolerance set for each arc cost function. For a given optimal flow x, avalidperturbation of cij(x) is a convex function that can be substituted for cij(x) in the total cost function without violating the optimality of x. Tolerance set for an arc(i, j) is the collection of all valid perturbations of cij(x). We characterize the tolerance set for each arc(i, j)intermsof nonsingleton shortest distances between nodes i and j.Wealsogiveanefficient algorithm to compute the nonsingleton shortest distances between all pairs of nodes in O(n 3)time where n denotes the number of nodes in the given graph. 1
ABSTRACT We present a survey on nonconvex models and algorithms for multicommodity network design pr...
A network design problem which arises in the distribution of a public utility provided by several co...
Minimum cost flow (MCF) problem is a typical example of network flow problems, for which an addition...
For the separable convex cost flow problem, we consider the problem of determining tolerance set for...
"December 1985."Bibliography: p. 56-57.National Science Foundation Grant NSF-ECS-8217668by Dimitri P...
National audienceWe consider a routing problem where we want to minimize the maximal relative conges...
Cover title. "The extended abstract of this article appeared in the proceedings of the 5th Internati...
We consider the problem of finding the minimum cost of a feasible flow in directed networks. We allo...
We show that the algorithm of Bertsekas, Polymenakos, and Tseng for min-cost flows with convex separ...
International audienceMulticommodity flow networks are known to be much harder than single-commodity...
Network design and flow problems appear in a wide variety of transportation applications. We conside...
This thesis examines several problems related to singly-constrained Monotropic Network Flow Problems...
An efficient polynomial time algorithm forsolving minimum cost flow problems has been proposedin thi...
Several researchers have recently developed new techniques that give fast algorithms for the minimum...
We describe a new algorithm for solving separable quadratic cost network programming problems and co...
ABSTRACT We present a survey on nonconvex models and algorithms for multicommodity network design pr...
A network design problem which arises in the distribution of a public utility provided by several co...
Minimum cost flow (MCF) problem is a typical example of network flow problems, for which an addition...
For the separable convex cost flow problem, we consider the problem of determining tolerance set for...
"December 1985."Bibliography: p. 56-57.National Science Foundation Grant NSF-ECS-8217668by Dimitri P...
National audienceWe consider a routing problem where we want to minimize the maximal relative conges...
Cover title. "The extended abstract of this article appeared in the proceedings of the 5th Internati...
We consider the problem of finding the minimum cost of a feasible flow in directed networks. We allo...
We show that the algorithm of Bertsekas, Polymenakos, and Tseng for min-cost flows with convex separ...
International audienceMulticommodity flow networks are known to be much harder than single-commodity...
Network design and flow problems appear in a wide variety of transportation applications. We conside...
This thesis examines several problems related to singly-constrained Monotropic Network Flow Problems...
An efficient polynomial time algorithm forsolving minimum cost flow problems has been proposedin thi...
Several researchers have recently developed new techniques that give fast algorithms for the minimum...
We describe a new algorithm for solving separable quadratic cost network programming problems and co...
ABSTRACT We present a survey on nonconvex models and algorithms for multicommodity network design pr...
A network design problem which arises in the distribution of a public utility provided by several co...
Minimum cost flow (MCF) problem is a typical example of network flow problems, for which an addition...