https://orcid.org/0000-0002-4416-2285
References
- Baum, A. K. (2017). A flow-on-manifold formulation of differential-algebraic equations. Journal of Dynamics and Differential Equations, 29(4), 1259–1281. doi: 10.1007/s10884-015-9511-5
- Brenan, K. E., Campbell, S. L., & Petzold, L. R. (1989). Numerical solution of initial-value problem in differential algebraic equations. New York, NY: SIAM.
- Canizares, C., Fernandes, T., Geraldi, E., Gerin-Lajoie, L., Gibbard, M., Hiskens, I., & Vowles, D. (2017). Benchmark models for the analysis and control of small-signal oscillatory dynamics in power systems. IEEE Transactions on Power Systems, 32(1), 715–722. doi: 10.1109/TPWRS.2016.2561263
- Chilali, M., & Gahinet, P. (1996). H∞ Design with pole placement constraints: An LMI approach. IEEE Transactions on Automatic Control, 41(3), 358–367. doi: 10.1109/9.486637
- Chu, D., & Mehrmann, V. (1999). Disturbance decoupled observer design for descriptor systems. Systems and Control Letters, 38(1), 37–48. doi: 10.1016/S0167-6911(99)00045-6
- Dai, L. (1989). Singular control systems. Berlin: Springer-Verlag.
- Duan, G. R. (2010). Analysis and design of descriptor linear systems. New York, NY: Springer.
- Golub, G. H., & VanLoan, C. F. (1996). Matrix computations (3rd ed.). Baltimore, MD: Johns Hopkins University Press.
- Gross, T. B., Trenn, S., & Wirsen, A. (2014). Topological solvability and index characterizations for a common DAE power system model. Proceedings of the IEEE Multi-conference on Systems and Control, Antibes, France.
- Kailath, T. (1980). Linear systems. Upper Saddle River, NJ: Prentice-Hall.
- Khalil, H. K. (1996). Nonlinear systems. Upper Saddle River, NJ: Prentice-Hall.
- Kundur, P. (1994). Power system stability and control. New Delhi: Tata McGraw-Hill.
- Luo, C. (2011). A comprehensive invariant subspace-based framework for power system small-signal stability analysis (Ph.d. dissertation). Iowa State University, Ames, IA.
- Miller, S. A. (2001). An inexact bundle method for solving large structured linear matrix inequalities (Ph.d. dissertation). University of California, Santa Barbara.
- Miller, S. A., & Smith, R. S. (2000). A bundle method for efficiently solving large structured linear matrix inequalities. Proceedings of the IEEE American Control Conference. Chicago, IL.
- Padiyar, K. R. (2008). Power system dynamics: Stability and control. BS Publications.
- Pasqualetti, F., Bicchi, A., & Bullo, F. (2011). A graph-theoretical characterization of power network vulnerabilities. Proceedings of the IEEE American Control Conference. San Francisco, CA.
- Peaucelle, D., Henrion, D., & Labit, Y. (2002). User's guide for SeDuMi interface 1.01: Solving LMI problems with SeDuMi. Proceedings of the IEEE Conference CACSD.
- Rommes, J., & Martins, N. (2009). Exploiting structure in large-scale electrical circuit and power system problems. Linear Algebra and its Applications, 431, 318–333. doi: 10.1016/j.laa.2008.12.027
- Rommes, J., Martins, N., & Freitas, F. D. (2010). Computing rightmost eigenvalues for small-signal stability assessment of large-scale power systems. IEEE Transactions on Power Systems, 25(2), 929–938. doi: 10.1109/TPWRS.2009.2036822
- Sauer, P. W., & Pai, M. A. (1998). Power system dynamics and stability. Upper Saddle River, NJ: Prentice Hall.
- Scholtz, E. (2004). Observer-based monitors and distributed wave controllers for electromechanical disturbances in power system (Ph.d. dissertation) Massachusetts Institute of Technology, Cambridge, MA.
- Stykel, T. (2002). Analysis and numerical solution of generalized lyapunov equations (Ph.d. dissertation). Technical University Berlin.
- Tripathy, S. C., Prasad, G. D., Malik, O. P., & Hope, G. S. (1982). Load-flow solutions for ill-conditioned power systems by a newton-like method. IEEE Transactions on Power Apparatus and Systems, 101(10), 3648–3657. doi: 10.1109/TPAS.1982.317050