In the generalized max flow problem, the aim is to find a maximum flow in a generalized network, i.e., a network with multipliers on the arcs that specify which portion of the flow entering an arc at its tail node reaches its head node. We consider this problem for the class of series-parallel graphs. First, we study the continuous case of the problem and prove that it can be solved using a greedy approach. Based on this result, we present a combinatorial algorithm that runs in O(m*m) time and a dynamic programming algorithm with running time O(m*log(m)) that only computes the maximum flow value but not the flow itself. For the integral version of the problem, which is known to be NP-complete, we present a pseudo-polynomial algorithm
Abstract Maximum adjacency (MA) ordering has effectively been applied to graph connectivity problems...
AbstractLetG=(V,A) be a directed, planar graph, lets,t∈V,s≠t, and letca>0 be the capacity of an arca...
The problem is to modify the capacities of the arcs from a network so that a given feasible flow bec...
The problem of finding the maximum flow in nets of a special form is considered. In such nets the ar...
This work presents an algorithm for the generalized maximum flow problem. First, we describe the tra...
We consider the maximum flow problem with minimum quantities (MFPMQ), which is a variant of the maxi...
This paper presents two new combinatorial algorithms for the generalized circulation problem. After ...
ABSTRACT. This paper presents new algorithms for the maximum flow problem, the Hitchcock transportat...
Summary. The maximum flow problem is a fundamental problem in graph theory and combinatorial optimiz...
Maximum flow problem is one of the fundamental problems in network flow theory and has been extensiv...
Generalized network flow problems generalize normal network flow problems by specifying a flow multi...
The aim of this chapter is to present an overview of the main results for a well-known optimization ...
A dynamic network consists of a directed graph with capacities, costs, and integral transit times on...
We give an O(n1.5 logn) time algorithm for finding the maximum flow in a directed planar graph with ...
In this paper, we introduce a new framework for approx-imately solving flow problems in capacitated,...
Abstract Maximum adjacency (MA) ordering has effectively been applied to graph connectivity problems...
AbstractLetG=(V,A) be a directed, planar graph, lets,t∈V,s≠t, and letca>0 be the capacity of an arca...
The problem is to modify the capacities of the arcs from a network so that a given feasible flow bec...
The problem of finding the maximum flow in nets of a special form is considered. In such nets the ar...
This work presents an algorithm for the generalized maximum flow problem. First, we describe the tra...
We consider the maximum flow problem with minimum quantities (MFPMQ), which is a variant of the maxi...
This paper presents two new combinatorial algorithms for the generalized circulation problem. After ...
ABSTRACT. This paper presents new algorithms for the maximum flow problem, the Hitchcock transportat...
Summary. The maximum flow problem is a fundamental problem in graph theory and combinatorial optimiz...
Maximum flow problem is one of the fundamental problems in network flow theory and has been extensiv...
Generalized network flow problems generalize normal network flow problems by specifying a flow multi...
The aim of this chapter is to present an overview of the main results for a well-known optimization ...
A dynamic network consists of a directed graph with capacities, costs, and integral transit times on...
We give an O(n1.5 logn) time algorithm for finding the maximum flow in a directed planar graph with ...
In this paper, we introduce a new framework for approx-imately solving flow problems in capacitated,...
Abstract Maximum adjacency (MA) ordering has effectively been applied to graph connectivity problems...
AbstractLetG=(V,A) be a directed, planar graph, lets,t∈V,s≠t, and letca>0 be the capacity of an arca...
The problem is to modify the capacities of the arcs from a network so that a given feasible flow bec...