When the underlying physical network layer in optimal network flow problems is a large graph, the associated optimization problem has a large set of decision variables. In this paper, we discuss how the cycle basis from graph theory can be used to reduce the size of this decision variable space. The idea is to eliminate the aggregated flow conservation constraint of these problems by explicitly characterizing its solutions in terms of the span of the columns of the transpose of a fundamental cycle basis matrix of the network plus a particular solution. We show that for any given input/output flow vector, a particular solution can be efficiently constructed from tracing any path that connects a source node to a sink node. We demonstrate our ...
AbstractWe examine a network upgrade problem for cost flows. A budget can be distributed among the a...
The optimal power flow (OPF) problem is fundamental in power systems operation and planning. Large-s...
M.Sc. (Mathematics)In Chapter 1, we consider the relevant theory pertaining to graphs and digraphs t...
Many large-scale and safety critical systems can be modeled as flow networks. Traditional approaches...
Abstract — The optimal power flow (OPF) problem is funda-mental in power system operations and plann...
This paper presents a new algorithm for identifying all supported non-dominated vectors (or outcomes...
The aim of this chapter is to present an overview of the main results for a well-known optimization ...
AbstractIt is shown that an acyclic multigraph with a single source and a single sink is series-para...
Linear optimal power flow (LOPF) algorithms use a linearization of the alternating current (AC) load...
A processing network problem is a network flow problem with the following characteristics: 1. conser...
ABSTRACT. This paper presents new algorithms for the maximum flow problem, the Hitchcock transportat...
We propose a branch flow model for the analysis and optimization of mesh as well as radial networks....
Abstract: The theory and applications of network flows is probabily the most important single tool f...
Summary. The maximum flow problem is a fundamental problem in graph theory and combinatorial optimiz...
Abstract—This paper is concerned with the optimal power flow (OPF) problem. We have recently shown t...
AbstractWe examine a network upgrade problem for cost flows. A budget can be distributed among the a...
The optimal power flow (OPF) problem is fundamental in power systems operation and planning. Large-s...
M.Sc. (Mathematics)In Chapter 1, we consider the relevant theory pertaining to graphs and digraphs t...
Many large-scale and safety critical systems can be modeled as flow networks. Traditional approaches...
Abstract — The optimal power flow (OPF) problem is funda-mental in power system operations and plann...
This paper presents a new algorithm for identifying all supported non-dominated vectors (or outcomes...
The aim of this chapter is to present an overview of the main results for a well-known optimization ...
AbstractIt is shown that an acyclic multigraph with a single source and a single sink is series-para...
Linear optimal power flow (LOPF) algorithms use a linearization of the alternating current (AC) load...
A processing network problem is a network flow problem with the following characteristics: 1. conser...
ABSTRACT. This paper presents new algorithms for the maximum flow problem, the Hitchcock transportat...
We propose a branch flow model for the analysis and optimization of mesh as well as radial networks....
Abstract: The theory and applications of network flows is probabily the most important single tool f...
Summary. The maximum flow problem is a fundamental problem in graph theory and combinatorial optimiz...
Abstract—This paper is concerned with the optimal power flow (OPF) problem. We have recently shown t...
AbstractWe examine a network upgrade problem for cost flows. A budget can be distributed among the a...
The optimal power flow (OPF) problem is fundamental in power systems operation and planning. Large-s...
M.Sc. (Mathematics)In Chapter 1, we consider the relevant theory pertaining to graphs and digraphs t...