A Dynamic Theory-Based Method for the Computation of an Unstable Equilibrium Point

TL;DR

This paper introduces a novel dynamic transformation and trajectory-based integration method for efficiently computing unstable equilibrium points in power systems, improving accuracy and convergence speed.

Contribution

It combines a transformation to convert UEPs into SEPs with a quasi-Newton pseudo-transient continuation, enhancing stability and convergence in power system analysis.

Findings

Accurately computes UEPs in power systems.

Faster and more stable than existing methods.

Enlarges the convergence region for UEP computation.

Abstract

In this paper, a new combination of a dynamic transformation method and a trajectory-based integration technique is proposed for the model independent computation of unstable equilibrium points (UEPs). The transformation method converts a UEP into a stable equilibrium point (SEP) to expand the convergence region by creating a quotient gradient system. The resulting SEP is then calculated using a quasi-Newton form of the pseudo-transient continuation method that exploits the structure of the quotient gradient system to speed up computation. The proposed method's conditions for convergence are presented, and the method is tested on the WSCC 9-bus 3-machine system and the IEEE 145-bus 50-machine system. The results show that the proposed method gives accurate results, it is sufficiently fast, numerically stable, and enlarges the convergence region of the UEP.