AbstractWe prove a strong version of the Max-Flow Min-Cut theorem for countable networks, namely that in every such network there exist a flow and a cut that are “orthogonal” to each other, in the sense that the flow saturates the cut and is zero on the reverse cut. If the network does not contain infinite trails then this flow can be chosen to be mundane, i.e. to be a sum of flows along finite paths. We show that in the presence of infinite trails there may be no orthogonal pair of a cut and a mundane flow. We finally show that for locally finite networks there is an orthogonal pair of a cut and a flow that satisfies Kirchhoff's first law also for ends
AbstractThe all pairs minimum cuts problem in a capacitated undirected network is well known. Gomory...
The problem of finding maximal flow in networks with barrier reachability is considered. It is shown...
We consider multicommodity flow and cut problems in polymatroidal networks where there are sub-modul...
We prove a strong version of the the Max-Flow Min-Cut theorem for countable networks, namely that in...
AbstractWe prove a strong version of the Max-Flow Min-Cut theorem for countable networks, namely tha...
Aharoni et al. [Ron Aharoni et al., 2010] proved the max-flow min-cut theorem for countable networks...
The celebrated duality theorem called max-flow min-cut theorem on a finite network due to Ford and F...
M.Sc. (Mathematics)In Chapter 1, we consider the relevant theory pertaining to graphs and digraphs t...
1. Introduction. A number of results in the theory of graphs, including Menger's Theorem [2] an...
In this paper, we prove the first approximate max-flow min-cut theorem for undirected mult icommodit...
AbstractA theorem is established that provides necessary and sufficient conditions in order that a l...
In this bachelors's thesis we study the problem of k-bounded flows, i.e. flows which can be decompos...
AbstractT. C. Hu and K. Jacobs independently proposed continuous analogs of Ford-Fulkerson flows in ...
Abstract: The theory and applications of network flows is probabily the most important single tool f...
Abstract. In this paper, we establish max-flow min-cut theorems for several important classes of mul...
AbstractThe all pairs minimum cuts problem in a capacitated undirected network is well known. Gomory...
The problem of finding maximal flow in networks with barrier reachability is considered. It is shown...
We consider multicommodity flow and cut problems in polymatroidal networks where there are sub-modul...
We prove a strong version of the the Max-Flow Min-Cut theorem for countable networks, namely that in...
AbstractWe prove a strong version of the Max-Flow Min-Cut theorem for countable networks, namely tha...
Aharoni et al. [Ron Aharoni et al., 2010] proved the max-flow min-cut theorem for countable networks...
The celebrated duality theorem called max-flow min-cut theorem on a finite network due to Ford and F...
M.Sc. (Mathematics)In Chapter 1, we consider the relevant theory pertaining to graphs and digraphs t...
1. Introduction. A number of results in the theory of graphs, including Menger's Theorem [2] an...
In this paper, we prove the first approximate max-flow min-cut theorem for undirected mult icommodit...
AbstractA theorem is established that provides necessary and sufficient conditions in order that a l...
In this bachelors's thesis we study the problem of k-bounded flows, i.e. flows which can be decompos...
AbstractT. C. Hu and K. Jacobs independently proposed continuous analogs of Ford-Fulkerson flows in ...
Abstract: The theory and applications of network flows is probabily the most important single tool f...
Abstract. In this paper, we establish max-flow min-cut theorems for several important classes of mul...
AbstractThe all pairs minimum cuts problem in a capacitated undirected network is well known. Gomory...
The problem of finding maximal flow in networks with barrier reachability is considered. It is shown...
We consider multicommodity flow and cut problems in polymatroidal networks where there are sub-modul...