论文信息 - Compensation Methods for Network Solutions by Optimally Ordered Triangular Factorization

Compensation Methods for Network Solutions by Optimally Ordered Triangular Factorization

The compensation theorem is applied in conjunction with ordered triangular factorization of the nodal admittance matrix to simulate the effect of changes in the passive elements of the network on the solution of a problem without changing the factorization. The scheme includes network elements with mutual impedances. Compared with impedance matrix methods which are ordinarily used for power system applications, this method, which permits exploitation of matrix sparsity, always requires less computer storage and, with few exceptions, is much faster.

William F. Tinney | W. Tinney

[1] Hermann W. Dommel,et al. Nonlinear and Time-Varying Elements in Digital Simulation of Electromagnetic Transients , 1971 .

[2] Tomas E. Dy Liacco,et al. Short-Circuit Calculations for Multiline Switching and End Faults , 1970 .

[3] J. O. Storry,et al. An Improved Method of Incorporating Mutual Couplings in Single-Phase Short-Circuit Calculations , 1970 .

[4] D. K. Reitan,et al. Modification of the bus impedance matrix for system changes involving mutual couplings , 1969 .

[5] J. W. Walker,et al. Direct solutions of sparse network equations by optimally ordered triangular factorization , 1967 .

[6] William F. Tinney,et al. Techniques for Exploiting the Sparsity or the Network Admittance Matrix , 1963 .