An Analysis of Interarea Dynamics of Multi-Machine Systems

The slow coherency concept is introduced and an algorithm is developed for grouping machines having identical slow motions into areas. The singular perturbation method is used to separate the slow variables which are the area center of inertia variables and the fast variables which describe the intermachine oscillations within the areas. The areas obtained by this method are independent of fault locations. Three types of simulation approximations illustrated on a nonlinear 48 machine system indicate the validity of this algorithm.

[1]  R. Podmore,et al.  A Practical Method for the Direct Analysis of Transient Stability , 1979, IEEE Transactions on Power Apparatus and Systems.

[2]  James Hardy Wilkinson,et al.  Linear algebra , 1971, Handbook for automatic computation.

[3]  P. Kokotovic,et al.  Area Decomposition for Electromechanical Models of Power Systems , 1980 .

[4]  Robin Podmore,et al.  Identification of Coherent Generators for Dynamic Equivalents , 1978, IEEE Transactions on Power Apparatus and Systems.

[5]  E. M. Gulachenski,et al.  Testing of the Modal Dynamic Equivalents Technique , 1978, IEEE Transactions on Power Apparatus and Systems.

[6]  K. Neil Stanton,et al.  Dynamic Energy Balance Studies for Simulation of Power-Frequency Transients , 1972 .

[7]  Joe H. Chow,et al.  Area decomposition for electromechanical models of power systems , 1980, Autom..

[8]  Joe H. Chow,et al.  Singular perturbation and iterative separation of time scales , 1980, Autom..

[9]  R. Schlueter,et al.  Modal-Coherent Equivalents Derived from an RMS Coherency Measure , 1980, IEEE Transactions on Power Apparatus and Systems.