Understanding Early Indicators of Critical Transitions in Power Systems From Autocorrelation Functions

Many dynamical systems, including power systems, recover from perturbations more slowly as they approach critical transitions - a phenomenon known as critical slowing down. If the system is stochastically forced, autocorrelation and variance in time-series data from the system often increase before the transition, potentially providing an early warning of coming danger. In some cases, these statistical patterns are sufficiently strong, and occur sufficiently far from the transition, that they can be used to predict the distance between the current operating state and the critical point. In other cases CSD comes too late to be a good indicator. In order to better understand the extent to which CSD can be used as an indicator of proximity to bifurcation in power systems, this paper derives autocorrelation functions for three small power system models, using the stochastic differential algebraic equations (SDAE) associated with each. The analytical results, along with numerical results from a larger system, show that, although CSD does occur in power systems, its signs sometimes appear only when the system is very close to transition. On the other hand, the variance in voltage magnitudes consistently shows up as a good early warning of voltage collapse.

[1]  Federico Milano,et al.  Equivalency of Continuation and Optimization Methods to Determine Saddle-Node and Limit-Induced Bifurcations in Power Systems , 2009, IEEE Transactions on Circuits and Systems I: Regular Papers.

[2]  D. Hill,et al.  Numerical Simulation for Stochastic Transient Stability Assessment , 2012, IEEE Transactions on Power Systems.

[3]  Adilson E. Motter,et al.  Stochastic Model for Power Grid Dynamics , 2006, 2007 40th Annual Hawaii International Conference on System Sciences (HICSS'07).

[4]  Chika O. Nwankpa,et al.  Computation of singular and singularity induced bifurcation points of differential-algebraic power system model , 2004, IEEE Transactions on Circuits and Systems I: Regular Papers.

[5]  Charles Concordia,et al.  Concepts of Synchronous Machine Stability as Affected by Excitation Control , 1969 .

[6]  David J. Hill,et al.  Transient stability enhancement and voltage regulation of power systems , 1993 .

[7]  R.J. Thomas,et al.  On voltage collapse in electric power systems , 1989, Conference Papers Power Industry Computer Application Conference.

[8]  V. Ajjarapu,et al.  Bifurcation theory and its application to nonlinear dynamical phenomena in an electrical power system , 1991 .

[9]  Paul D. H. Hines,et al.  Estimating dynamic instability risk by measuring critical slowing down , 2011, 2011 IEEE Power and Energy Society General Meeting.

[10]  Derin B. Wysham,et al.  Regime shifts in ecological systems can occur with no warning. , 2010, Ecology letters.

[11]  Sairaj V. Dhople,et al.  Analysis of Power System Dynamics Subject to Stochastic Power Injections , 2013, IEEE Transactions on Circuits and Systems I: Regular Papers.

[12]  M. Scheffer,et al.  Early warning of climate tipping points from critical slowing down: comparing methods to improve robustness , 2012, Philosophical Transactions of the Royal Society A: Mathematical, Physical and Engineering Sciences.

[13]  Ian Dobson,et al.  Towards a theory of voltage collapse in electric power systems , 1989 .

[14]  F. Milano,et al.  A Systematic Method to Model Power Systems as Stochastic Differential Algebraic Equations , 2013, IEEE Transactions on Power Systems.

[15]  Jorge L. Moiola,et al.  Bifurcation Analysis on a Multimachine Power System Model , 2010, IEEE Transactions on Circuits and Systems I: Regular Papers.

[16]  S. Carpenter,et al.  Early-warning signals for critical transitions , 2009, Nature.

[17]  G. Vachtsevanos,et al.  Epileptic Seizures May Begin Hours in Advance of Clinical Onset A Report of Five Patients , 2001, Neuron.

[18]  A. Phadke,et al.  Control of voltage stability using sensitivity analysis , 1992 .

[19]  A. Bergen,et al.  A security measure for random load disturbances in nonlinear power system models , 1987 .

[20]  C. Gardiner Stochastic Methods: A Handbook for the Natural and Social Sciences , 2009 .

[21]  M. Scheffer,et al.  Slowing Down in Spatially Patterned Ecosystems at the Brink of Collapse , 2011, The American Naturalist.

[22]  Riccardo Mannella,et al.  ITÔ VERSUS STRATONOVICH: 30 YEARS LATER , 2012, The Random and Fluctuating World.

[23]  M. Glavic,et al.  Wide-Area Detection of Voltage Instability From Synchronized Phasor Measurements. Part I: Principle , 2009, IEEE Transactions on Power Systems.

[24]  Christopher M. Danforth,et al.  Predicting Critical Transitions From Time Series Synchrophasor Data , 2012, IEEE Transactions on Smart Grid.

[25]  Dmitry Podolsky,et al.  Random load fluctuations and collapse probability of a power system operating near codimension 1 saddle-node bifurcation , 2012, 2013 IEEE Power & Energy Society General Meeting.

[26]  Xiaoshu Luo,et al.  Noise-induced chaos in single-machine infinite-bus power systems , 2009 .

[27]  W. Rüemelin Numerical Treatment of Stochastic Differential Equations , 1982 .

[28]  Vijay Vittal,et al.  Trajectory Sensitivity Based Preventive Control of Voltage Instability Considering Load Uncertainties , 2012, IEEE Transactions on Power Systems.

[29]  K. R. Padiyar,et al.  ENERGY FUNCTION ANALYSIS FOR POWER SYSTEM STABILITY , 1990 .

[30]  M. Boerlijst,et al.  Catastrophic Collapse Can Occur without Early Warning: Examples of Silent Catastrophes in Structured Ecological Models , 2013, PloS one.

[31]  M. Scheffer,et al.  Recovery rates reflect distance to a tipping point in a living system , 2011, Nature.

[32]  N. Mithulananthan,et al.  Linear performance indices to predict oscillatory stability problems in power systems , 2004, IEEE Transactions on Power Systems.

[33]  Eduardo Cotilla-Sanchez,et al.  Calculation of the autocorrelation function of the stochastic single machine infinite bus system , 2013, 2013 North American Power Symposium (NAPS).

[34]  P. Kundur,et al.  Definition and classification of power system stability IEEE/CIGRE joint task force on stability terms and definitions , 2004, IEEE Transactions on Power Systems.

[35]  T. Van Cutsem,et al.  Voltage instability: phenomena, countermeasures, and analysis methods , 2000, Proc. IEEE.

[36]  Dmitry Podolsky,et al.  Critical slowing-down as indicator of approach to the loss of stability , 2013, 2014 IEEE International Conference on Smart Grid Communications (SmartGridComm).

[37]  R. Fischl,et al.  Local bifurcation in power systems: theory, computation, and application , 1995, Proc. IEEE.

[38]  D.J. Trudnowski,et al.  A Perspective on WAMS Analysis Tools for Tracking of Oscillatory Dynamics , 2007, 2007 IEEE Power Engineering Society General Meeting.

[39]  Mariesa L. Crow,et al.  The Fokker-Planck Equation for Power System Stability Probability Density Function Evolution , 2013, IEEE Transactions on Power Systems.

[40]  John Waldron,et al.  The Langevin Equation: With Applications in Physics, Chemistry and Electrical Engineering , 1996 .

[41]  C. Kuehn A mathematical framework for critical transitions: Bifurcations, fast–slow systems and stochastic dynamics , 2011, 1101.2899.

[42]  I. Mezic,et al.  Nonlinear Koopman Modes and a Precursor to Power System Swing Instabilities , 2012, IEEE Transactions on Power Systems.

[43]  Christian Kuehn,et al.  A Mathematical Framework for Critical Transitions: Normal Forms, Variance and Applications , 2011, J. Nonlinear Sci..

[44]  S. M. Shahidehpour,et al.  Stochastic Approach to Small Disturbance Stability Analysis , 1992, IEEE Power Engineering Review.

[45]  I. Dobson Observations on the geometry of saddle node bifurcation and voltage collapse in electrical power systems , 1992 .

[46]  Michael Chertkov,et al.  Voltage Collapse and ODE Approach to Power Flows: Analysis of a Feeder Line with Static Disorder in Consumption/Production , 2011, ArXiv.

[47]  C. Cañizares On bifurcations, voltage collapse and load modeling , 1995 .

[48]  F. Milano,et al.  An open source power system analysis toolbox , 2005, 2006 IEEE Power Engineering Society General Meeting.

[49]  Ian Dobson,et al.  THE IRRELEVANCE OF LOAD DYNAMICS FOR THE LOADING MARGIN TO VOLTAGE COLLAPSE AND ITS SENSITIVITIES , 1994 .

[50]  M. Scheffer,et al.  Slowing down as an early warning signal for abrupt climate change , 2008, Proceedings of the National Academy of Sciences.