AbstractWe consider the undirected maximum multiflow (multicommodity flow) problem in the case when the commodity graph is the disjoint union of K3 and K2. We prove that if the supply graph satisfies a certain Eulerian-type condition, then the problem has an integer optimal solution. To obtain this result, we first study the corresponding dual problem on metrics and show that an optimal solution to the latter is achieved on some (2,3)-metric or some 3-cut metric
Consider the multicommodity flow problem in which the object is to maximize the sum of commodities r...
Doctor of PhilosophyDepartment of MathematicsNathan AlbinMaximum flow problems involve finding a fea...
noteWe present a survey about the maximum integral multiflow and minimum multicut problems and their...
AbstractWe consider the undirected maximum multiflow (multicommodity flow) problem in the case when ...
In this paper we discuss a number of recent and earlier results in the field of combinatorial optimi...
AbstractWe consider the multiflow feasibility problem whose demand graph is the vertex-disjoint unio...
Generalizing the two-commodity flow theorem of Rothschild and Whinston and the multiflow theorem of ...
We compare two multicommodity flow problems, the maximum sum of flow, and the maximum concurrent flo...
AbstractGiven an undirected Eulerian network with the terminal-set { s } ∪T , we call a vector ξ= (ξ...
AbstractIn this paper, we give a complete characterization of the class of weighted maximum multiflo...
AbstractWe give a polynomial algorithm which decides the integer solvability of multi-commodity flow...
In this paper we consider the worst case ratio between the capacity of min-cuts and the value of max...
94 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1981.Multicommodity flows are studi...
Abstract. In this paper, we establish max-flow min-cut theorems for several important classes of mul...
In this paper, we introduce a new framework for approx-imately solving flow problems in capacitated,...
Consider the multicommodity flow problem in which the object is to maximize the sum of commodities r...
Doctor of PhilosophyDepartment of MathematicsNathan AlbinMaximum flow problems involve finding a fea...
noteWe present a survey about the maximum integral multiflow and minimum multicut problems and their...
AbstractWe consider the undirected maximum multiflow (multicommodity flow) problem in the case when ...
In this paper we discuss a number of recent and earlier results in the field of combinatorial optimi...
AbstractWe consider the multiflow feasibility problem whose demand graph is the vertex-disjoint unio...
Generalizing the two-commodity flow theorem of Rothschild and Whinston and the multiflow theorem of ...
We compare two multicommodity flow problems, the maximum sum of flow, and the maximum concurrent flo...
AbstractGiven an undirected Eulerian network with the terminal-set { s } ∪T , we call a vector ξ= (ξ...
AbstractIn this paper, we give a complete characterization of the class of weighted maximum multiflo...
AbstractWe give a polynomial algorithm which decides the integer solvability of multi-commodity flow...
In this paper we consider the worst case ratio between the capacity of min-cuts and the value of max...
94 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1981.Multicommodity flows are studi...
Abstract. In this paper, we establish max-flow min-cut theorems for several important classes of mul...
In this paper, we introduce a new framework for approx-imately solving flow problems in capacitated,...
Consider the multicommodity flow problem in which the object is to maximize the sum of commodities r...
Doctor of PhilosophyDepartment of MathematicsNathan AlbinMaximum flow problems involve finding a fea...
noteWe present a survey about the maximum integral multiflow and minimum multicut problems and their...