A Sufficient Condition for Power Flow Insolvability with Applications to Voltage Stability Margins

TL;DR

This paper introduces a new sufficient condition for power flow insolvability, linking it to a convex optimization framework that measures voltage stability margins, including a novel margin based on bus voltages.

Contribution

It presents a novel sufficient condition for power flow insolvability using a convex optimization approach, extending voltage stability margin concepts to include bus voltage parameters.

Findings

The condition effectively predicts power flow insolvability.

A new voltage-based stability margin is proposed.

The method relates to existing voltage stability measures.

Abstract

For the nonlinear power flow problem specified with standard PQ, PV, and slack bus equality constraints, we present a sufficient condition under which the specified set of nonlinear algebraic equations has no solution. This sufficient condition is constructed in a framework of an associated feasible, convex optimization problem. The objective employed in this optimization problem yields a measure of distance (in a parameter set) to the power flow solution boundary. In practical terms, this distance is closely related to quantities that previous authors have proposed as voltage stability margins. A typical margin is expressed in terms of the parameters of system loading (injected powers); here we additionally introduce a new margin in terms of the parameters of regulated bus voltages.