Probabilistic Transient Stability Studies e Method of Bisection

In this paper, a method of bisection is computation time required to determine the probabilistic introduced as a to.01 to considerably reduce the transient stability indices. This method can also help in amount Of time required in the predicting the number of stability runs required to calculate the stochastic evaluation of transient stability. This probabilistic transient stability indices at a specific system location, for a certain transmission line or for the overall method proves to be very helpful in predicting the number of stability runs required to calculate the probabilistic transient stability indices for a given system. The bisection algorithm is examined utilizing a small system location, a certain transmission line or for test system (RBTS) (ll). The effect of load forecast uncertainty the overall system. The developed method is is also illustrated. The effect of employing high-speed examined utilizing a hypothetical test system and simultaneous or adaptive reclosing is also presented in this the effect of load forecast uncertainty is illustrated. paper. The effect of modeling and employing high-speed PROBABILISTIC FACTORS IN TRANSIENT STABLITY simultaneous or adaptive reclosing is also presented and discussed.

[1]  Davide Lauria,et al.  Probabilistic approach to transient stability evaluation , 1994 .

[2]  Vijay Vittal,et al.  Power System Transient Stability Analysis Using the Transient Energy Function Method , 1991 .

[3]  Philip Sporn,et al.  Ultrahigh-speed reclosing of high-voltage transmission lines , 1937, Electrical Engineering.

[4]  R. Billinton,et al.  Probabilistic Assessment of Transient Stability in a Practical Multimachine System , 1981, IEEE Transactions on Power Apparatus and Systems.

[5]  Edward Wilson Kimbark,et al.  Power System Stability , 1948 .

[6]  Roy Billinton,et al.  Stochastic modelling of high-speed reclosing in probabilistic transient stability studies , 1995 .

[7]  Hsu Yuan-Yih,et al.  Probabilistic transient stability studies using the conditional probability approach , 1988 .

[8]  R. Billinton,et al.  A Reliability Test System for Educational Purposes-Basic Data , 1989, IEEE Power Engineering Review.

[9]  Anjan Bose,et al.  A Probabilistic Approach to Power System Stability Analysis , 1983, IEEE Transactions on Power Apparatus and Systems.

[10]  George J. Anders,et al.  Probability Concepts in Electric Power Systems , 1990 .

[11]  R. Billinton,et al.  An Approximate Method for Probabilistic Assessment of Transient Stability , 1979, IEEE Transactions on Reliability.

[12]  R. Billinton,et al.  A Probabilistic Index for Transient Stability , 1980, IEEE Transactions on Power Apparatus and Systems.

[13]  Roy Billinton,et al.  Reliability Evaluation of Engineering Systems , 1983 .

[14]  M. Pai Energy function analysis for power system stability , 1989 .

[15]  Roy Billinton,et al.  Probabilistic evaluation of transient stability in a multimachine power system , 1979 .

[16]  Roy Billinton,et al.  Reliability evaluation of power systems , 1984 .

[17]  Sherif O. Faried,et al.  Effect of adaptive reclosing on turbine-generator shaft torsional torques , 1994 .