[[1] ACHA, E.-FUERTE-ESQUIVEL, C. R.-AMBRIZ-P´EREZ, H.-ANGELES-CAMACHO, C. : FACTS, Modelling and Simulation in Power Networks, John Wiley & Sons Ltd, 2004.10.1002/0470020164]Search in Google Scholar
[[2] ZHANG, S. P.-REHTANZ, C.-PAL, B. : Flexible AC Transmission Systems: Modelling and Control, Springer, Berlin, Heidelberg, New York, 2006.]Search in Google Scholar
[[3] DOMMEL, H. W.-TINNEY, W. F. : Optimal Power Flow Solutions, IEEE Trans. Power Apparatus and Systems PAS-87 No. 10 (1968), 1866-1876.10.1109/TPAS.1968.292150]Search in Google Scholar
[[4] MARIA, G. A.-FINDLAY, J. A. : A Newton Optimal Power Flow Program for Ontario Hydro EMS, IEEE Trans. Power Systems PWRS-2 No. 3 (1987), 576-584.10.1109/TPWRS.1987.4335171]Search in Google Scholar
[[5] MONTICELLI, A.-LIU, W. H. E. : Adaptive Movement Penalty Method for the Newton Optimal Power Flow, IEEE Trans. Power Systems 7 No. 1 (1992), 334-342.10.1109/59.141723]Search in Google Scholar
[[6] SUN, D. I.-ASHLEY, B.-BREWER, B.-HUGHES, A.- TINNEY, W. F. : Optimal Power Flow By Newton Approach, IEEE Trans. Power Apparatus and Systems PAS-103 No. 10 (1984), 2864-2880.10.1109/TPAS.1984.318284]Search in Google Scholar
[[7] DAS, D. : Electrical Power Systems, New Age International (P) Ltd, Publishers.]Search in Google Scholar
[[8] FUERTE-ESQUIVEL, C. R.-ACHA, E.-AMBRIZ-P´EREZ, H. : A Thyristor Controlled Series Compensator Model for the Power Flow Solution of Practical Power Electronic, IEEE Transactions on Power Systems 15 No. 1 (Feb 2000).10.1109/59.852101]Search in Google Scholar