Effect of load increase and power system stabilizer on stability delay margin of a generator excitation control system

This paper studies the impact of load increase and a power system stabilizer (PSS) on the stability delay margin of a single-machine-infinite-bus system including an automatic voltage regulator. An analytical method is proposed to determine the stability delay margin of the excitation control system. The proposed method first eliminates transcendental terms in the characteristic equation of the excitation system without making any approximation and transforms the transcendental characteristic equation into a regular polynomial. The key result of the elimination process is that the real roots of the new polynomial correspond to the imaginary roots of the transcendental characteristic equation. With the help of the new polynomial, it is also possible to determine the delay dependency of system stability and the root tendency with respect to the time delay. Delay margins are computed for various loading conditions and PSS gains. It is observed that the delay margin generally decreases as the PSS gain and load demand increase, resulting in a less stable system.

[1]  Chika O. Nwankpa,et al.  An Exact Method for Computing Delay Margin for Stability of Load Frequency Control Systems With Constant Communication Delays , 2016, IEEE Transactions on Power Systems.

[2]  J. Wen,et al.  Delay-Dependent Stability Analysis of the Power System With a Wide-Area Damping Controller Embedded , 2011, IEEE Transactions on Power Systems.

[3]  Damir Filipović,et al.  Delayed resonator with speed feedback – design and performance analysis , 2002 .

[4]  G.T. Heydt,et al.  Evaluation of time delay effects to wide-area power system stabilizer design , 2004, IEEE Transactions on Power Systems.

[5]  Deqiang Gan,et al.  The stability of AGC systems with commensurate delays , 2007 .

[6]  Nejat Olgaç,et al.  Stability Robustness Analysis of Multiple Time- Delayed Systems Using “Building Block” Concept , 2007, IEEE Transactions on Automatic Control.

[7]  Nader Jalili,et al.  MULTIPLE DELAYED RESONATOR VIBRATION ABSORBERS FOR MULTI-DEGREE-OF-FREEDOM MECHANICAL STRUCTURES , 1999 .

[8]  Jinchen Ji,et al.  Stability and bifurcation in an electromechanical system with time delays , 2003 .

[9]  Saffet Ayasun,et al.  Stability analysis of a generator excitation control system with time delays , 2009 .

[10]  Rifat Sipahi,et al.  An exact method for the stability analysis of time-delayed linear time-invariant (LTI) systems , 2002, IEEE Trans. Autom. Control..

[11]  Xiang-Ping Yan,et al.  Stability and bifurcation analysis for a delayed Lotka-Volterra predator-prey system , 2006 .

[12]  Yongli Song,et al.  Stability and bifurcation analysis on a Logistic model with discrete and distributed delays , 2006, Appl. Math. Comput..

[13]  Q. H. Wu,et al.  Delay-Dependent Stability for Load Frequency Control With Constant and Time-Varying Delays , 2009, IEEE Transactions on Power Systems.

[14]  Saffet Ayasun,et al.  Stability analysis of time-delayed DC motor speed control system , 2013 .

[15]  Shengyuan Xu,et al.  On Equivalence and Efficiency of Certain Stability Criteria for Time-Delay Systems , 2007, IEEE Transactions on Automatic Control.

[16]  Jingtao Wu,et al.  WAMS applications in Chinese power systems , 2006, IEEE Power and Energy Magazine.

[17]  J. Faiz,et al.  The Effect of Power System Stabilizer on Small Signal Stability in Single-Machine Infinite-Bus , 2010 .

[18]  Lihua Xie,et al.  Further Improvement of Free-Weighting Matrices Technique for Systems With Time-Varying Delay , 2007, IEEE Transactions on Automatic Control.

[19]  S. Ayasun,et al.  Computation of Time Delay Margins for Stability of a Single-Area Load Frequency Control System with Communication Delays , 2014 .

[20]  Kirk S. Walton,et al.  Direct method for TDS stability analysis , 1987 .

[21]  A.G. Phadke,et al.  Synchronized phasor measurements in power systems , 1993, IEEE Computer Applications in Power.

[22]  Hadi Saadat,et al.  Power System Analysis , 1998 .

[23]  Wei Yao,et al.  Wide-Area Damping Controller of FACTS Devices for Inter-Area Oscillations Considering Communication Time Delays , 2014, IEEE Transactions on Power Systems.

[24]  Ali Feliachi,et al.  Communication delays in wide area measurement systems , 2002, Proceedings of the Thirty-Fourth Southeastern Symposium on System Theory (Cat. No.02EX540).

[25]  Babu Narayanan,et al.  POWER SYSTEM STABILITY AND CONTROL , 2015 .

[26]  Peter W. Sauer,et al.  Power System Dynamics and Stability , 1997 .

[27]  Quanyuan Jiang,et al.  Stability analysis of multiple time delayed power systems using ‘Building Block’ concept , 2008, 2008 IEEE Power and Energy Society General Meeting - Conversion and Delivery of Electrical Energy in the 21st Century.

[28]  Saffet Ayasun,et al.  Computation of time delay margin for power system small‐signal stability , 2009 .

[29]  Wan-Tong Li,et al.  Hopf bifurcation and global periodic solutions in a delayed predator-prey system , 2006, Appl. Math. Comput..

[30]  Z. Rekasius,et al.  A stability test for systems with delays , 1980 .