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Propagating Parameter Uncertainty in Power System Nonlinear Dynamic Simulations Using a Koopman Operator-Based Surrogate Model

Yijun Xu, Marcos Netto, Lamine Mili

2022IEEE Transactions on Power Systems22 citationsDOIOpen Access PDF

Abstract

We propose a Koopman operator-based surrogate model for propagating parameter uncertainties in power system nonlinear dynamic simulations. First, we augment a priori known state-space model by reformulating parameters deemed uncertain as pseudo-state variables. Then, we apply the Koopman operator theory to the resulting state-space model and obtain a linear dynamical system model. This transformation allows us to analyze the evolution of the system dynamics through its Koopman eigenfunctions, eigenvalues, and modes. Of particular importance for this letter, the obtained linear dynamical system is a surrogate that enables the evaluation of parameter uncertainties by simply perturbing the initial conditions of the Koopman eigenfunctions associated with the pseudo-state variables. Simulations carried out on the New England test system reveal the excellent performance of the proposed method in terms of accuracy and computational efficiency.

Topics & Concepts

EigenfunctionNonlinear systemOperator (biology)Eigenvalues and eigenvectorsState spaceControl theory (sociology)Electric power systemA priori and a posterioriState variableMathematicsApplied mathematicsSurrogate modelDynamical system (definition)Parameter spaceDynamical systems theoryTransformation (genetics)Power (physics)Mathematical optimizationComputer sciencePhysicsArtificial intelligenceGeneControl (management)StatisticsRepressorQuantum mechanicsChemistryThermodynamicsBiochemistryPhilosophyEpistemologyTranscription factorModel Reduction and Neural NetworksFluid Dynamics and Vibration AnalysisPower System Optimization and Stability
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