[[abstract]]The minimum singular value of the Jacobian matrix of the load flow equation may have been preferred as an indicator of voltage collapse when the static voltage stability of power systems is studied. In this paper we propose a highly efficient algorithm to calculate the smallest singular value of a Jacobian matrix of the load flow equation by employing the non-iterative characteristic of an Incremental Condition Estimation (ICE) method and the sparsity characteristic of large scale power networks. Both theoretical basis and computation cost of the algorithm are also detailed in the context. Finally, a practical application example is also given for demonstration.[[fileno]]2010223010059[[department]]數學
In voltage stability analysis, both static and dynamic approaches are used to evaluate the system cr...
Higher utilization of electric power systems has renewed researchers' interest on voltage stability,...
Static voltage and angle stability conditions (and saddle node bifurcations) are often associated wi...
[[abstract]]When studying the static voltage stability of power systems, the smallest singular value...
The minimum singular value of the power flow Jacobian matrix has been used as a static voltage stabi...
This paper presents and discusses the use of static voltage stability indices based on a singular va...
Despite a tremendous development in optimal power flow (OPF), owing to the obvious complexity, non-l...
This paper presents the Load Increase Index, which is a new computationally efficient loadability li...
Due to economical and environmental constraints, the increasing interconnection between power system...
In voltage stability analysis, it is useful to assess voltage stability of power systems by means of...
New, fast and reliable algorithms for solving load-flow problems are presented in this thesis. Each ...
This paper presents a new voltage stability index based on the tangent vector of the power flow jaco...
AbstractIn voltage stability analysis, it is useful to assess voltage stability of power systems by ...
We consider the problem of characterizing and assessing the voltage stability in power distribution ...
Power flow calculations for systems with a large number of buses, e.g. grids with multiple voltage l...
In voltage stability analysis, both static and dynamic approaches are used to evaluate the system cr...
Higher utilization of electric power systems has renewed researchers' interest on voltage stability,...
Static voltage and angle stability conditions (and saddle node bifurcations) are often associated wi...
[[abstract]]When studying the static voltage stability of power systems, the smallest singular value...
The minimum singular value of the power flow Jacobian matrix has been used as a static voltage stabi...
This paper presents and discusses the use of static voltage stability indices based on a singular va...
Despite a tremendous development in optimal power flow (OPF), owing to the obvious complexity, non-l...
This paper presents the Load Increase Index, which is a new computationally efficient loadability li...
Due to economical and environmental constraints, the increasing interconnection between power system...
In voltage stability analysis, it is useful to assess voltage stability of power systems by means of...
New, fast and reliable algorithms for solving load-flow problems are presented in this thesis. Each ...
This paper presents a new voltage stability index based on the tangent vector of the power flow jaco...
AbstractIn voltage stability analysis, it is useful to assess voltage stability of power systems by ...
We consider the problem of characterizing and assessing the voltage stability in power distribution ...
Power flow calculations for systems with a large number of buses, e.g. grids with multiple voltage l...
In voltage stability analysis, both static and dynamic approaches are used to evaluate the system cr...
Higher utilization of electric power systems has renewed researchers' interest on voltage stability,...
Static voltage and angle stability conditions (and saddle node bifurcations) are often associated wi...