AbstractIn a feasible transportation problem, there is always an ordering of the arcs such that greedily sending maximal flow on each arc in turn, according to that order, yields a feasible solution. We characterize those transportation graphs for which there exists a single order which is good for all feasible problems with the same graph. The characterizations are shown to be intimately related to Monge sequences and to totally balanced matrices. We describe efficient algorithms which, for a given graph, construct such order whenever it exists. For a transportation problem with corresponding m×n bipartite graph with e arcs, we show how to generate such an order in O(min(e log e,mn)) steps. Using that order, the feasibility question for an...
Abstract. In this paper, we analyze the mass transportation prob-lem (a.k.a. the multi-commodity flo...
Abstract Maximum adjacency (MA) ordering has effectively been applied to graph connectivity problems...
We study solutions to the multi-marginal Monge-Kantorovich problem which are concentrated on several...
AbstractIn a feasible transportation problem, there is always an ordering of the arcs such that gree...
AbstractGiven a cost matrix of the transportation problem and a permutation of the decision variable...
AbstractWe give an efficient algorithm which determines whether a condition due to Hoffman (1963) is...
AbstractLet C be an n × m matrix. Then the sequence j:= ((i1, j1), (i2, j2), …, (inm, jnm)) of pairs...
Let C be an n \Theta m matrix. Then the sequence S := ((i 1 ; j 1 ); (i 2 ; j 2 ); : : : ; (i nm ; j...
AbstractThis paper considers the transportation problem, both in the standard form and in the case w...
AbstractIn 1781 the French mathematician G. Monge gave an optimality criterion and a greedy-like pro...
We continue the research on the effects of Monge structures in the area of combinatorial optimizatio...
1. Introduction. A number of results in the theory of graphs, including Menger's Theorem [2] an...
When it comes to maximization of effectively or minimizing of cost, optimization represents the key ...
The aim of this chapter is to present an overview of the main results for a well-known optimization ...
Generalized network flow problems generalize normal network flow problems by specifying a flow multi...
Abstract. In this paper, we analyze the mass transportation prob-lem (a.k.a. the multi-commodity flo...
Abstract Maximum adjacency (MA) ordering has effectively been applied to graph connectivity problems...
We study solutions to the multi-marginal Monge-Kantorovich problem which are concentrated on several...
AbstractIn a feasible transportation problem, there is always an ordering of the arcs such that gree...
AbstractGiven a cost matrix of the transportation problem and a permutation of the decision variable...
AbstractWe give an efficient algorithm which determines whether a condition due to Hoffman (1963) is...
AbstractLet C be an n × m matrix. Then the sequence j:= ((i1, j1), (i2, j2), …, (inm, jnm)) of pairs...
Let C be an n \Theta m matrix. Then the sequence S := ((i 1 ; j 1 ); (i 2 ; j 2 ); : : : ; (i nm ; j...
AbstractThis paper considers the transportation problem, both in the standard form and in the case w...
AbstractIn 1781 the French mathematician G. Monge gave an optimality criterion and a greedy-like pro...
We continue the research on the effects of Monge structures in the area of combinatorial optimizatio...
1. Introduction. A number of results in the theory of graphs, including Menger's Theorem [2] an...
When it comes to maximization of effectively or minimizing of cost, optimization represents the key ...
The aim of this chapter is to present an overview of the main results for a well-known optimization ...
Generalized network flow problems generalize normal network flow problems by specifying a flow multi...
Abstract. In this paper, we analyze the mass transportation prob-lem (a.k.a. the multi-commodity flo...
Abstract Maximum adjacency (MA) ordering has effectively been applied to graph connectivity problems...
We study solutions to the multi-marginal Monge-Kantorovich problem which are concentrated on several...