References
- Angeli, D. (2004). An almost global notion of input-to-state stability. IEEE Transactions on Automatic Control, 49 (6), 866–874.
- Angeli, D. , & Efimov, D. (2015). Characterizations of input-to-state stability for systems with multiple invariant sets. IEEE Transactions on Automatic Control, 60 (12), 3242–3256.
- Andronov, A.A. , Vitt, A.A. , & Khaikin, S.E . (1966). Theory of oscillations . Oxford: Pergamon Press. Originally published in Russian (1937).
- Attouch, H. , Goudou, X. , & Redont, P. (2000). The heavy ball with friction method. I. The continuous dynamical system: Global exploration of the local minima of a real-valued function by asymptotic analysis of a dissipative dynamical system. Communications in Contemporary Mathematics, 2 (01), 1–34.
- Begout, P. , Bolte, J. , & Jendoubi, M.A. (2015). On damped second-order gradient systems. Journal of Differential Equations, 259 (7), 3115–3145.
- Boyd, S. , El Ghaoui, L. , Feron, E. , & Balakrishnan, V . (1994). Linear matrix inequalities in system and control theory . Philadelphia, PA: SIAM.
- Brown, A.A. & Bartholomew-Biggs, M.C. (1989). Some effective methods for unconstrained optimization based on the solution of systems of ordinary differential equations. Journal of Optimization Theory and Applications, 62 (2), 211–224.
- Efimov, D.V. , & Sontag, E.D. (2011). Input to state stability and allied system properties. Automation and Remote Control, 72 (8), 1579–1614.
- Giesl, P. , & Hafstein, S. (2015). Review on computational methods for Lyapunov functions. Discrete and Continuous Dynamical Systems, Series B, 20 (8), 2291–2331.
- Haddad, W.M. , & Chellaboina, V.S . (2008). Nonlinear dynamical systems and control. A Lyapunov-based approach . Princeton, NJ: Princeton University Press.
- Kamenetsky, A.K. , & Pyatnitsky, E.S. (1987). An iterative method of Lyapunov function construction for differential inclusions. Systems and Control Letters , 8 (5), 445–451.
- LaSalle, J.P. , & Lefschetz, S . (1961). Stability by Lyapunov's direct method with applications . New York, NY: Academic Press.
- Lur’e, A.I. , & Postnikov, V. N. (1944). On the theory of stability of control systems. Applied Mathematics and Mechanics, 8 (3), 246–248.
- Lyapunov, A.M . (1892). The general problem of the stability of motion . Doctoral thesis, Kharkov: Kharkov Mathematical Society. (in Russian). Translated into English by Fuller, A.T. (1992). International Journal of Control , 55 (3), 531–773.
- Machowski, J. , Bialek, J. , & Bumby, J. (2012). Power system dynamics. Stability and control . 2nd ed. Chichester: John Wiley & Sons.
- Matisoff, M. , & Mazenc, F . (2009). Construction of strict Lyapunov functions . London: Springer Verlag.
- Nesterov, Yu. E. , & Polyak, B.T. (2006). Cubic regularization of Newton method and its global performance. Mathematical Programming, Series A, 108 (1), 177–205.
- Pai, M.A . (1989). Energy function analysis for power system stability . Boston, MA: Kluwer.
- Polyak, B.T. (1963). Gradient methods for minimizing functionals. USSR Computational Mathematics and Mathematical Physics, 3 (4), 864–878.
- Polyak, B.T. (1964). Some methods of speeding up the convergence of iteration methods. USSR Computational Mathematics and Mathematical Physics, 4 (5), 1–17.
- Polyak, B.T . (1987). Introduction to optimization . New York, NY: Optimization Software.
- Rapoport, L.B. (2005). Extension of the S-procedure and analysis of the multidimensional control systems using linear matrix inequalities. Automation and Remote Control, 22 (1), 31–42.
- Reitmann, V. , Smirnova, V.B. , & Leonov, G.A . (1992). Non-local methods for pendulum-like feedback systems . Wiesbaden: Springer.
- Sontag, E.D. (1995). On the input-to-state stability property. European Journal of Control, 1 (1), 24–36.
- Su, W. , Boyd, S. , & Candes, E.J . (2014, December). A differential equation for modeling Nesterov's accelerated gradient method: Theory and insights. Paper presented at The 28th Annual Conference on Advances in Neural Information Processing Systems (NIPS) (pp. 2510–2518). Montreal.
- Tricomi, F. (1933). Integrazione di un’equazione differenziale presentatasi in elettrotecnicf [Integration of a differential equation encountered in electrical engineering]. Annali della Scuola Normale Superiore di Pisa – Classe di Scienze 2, 2 (1), 1–20.
- Vu, T.L. , & Turitsyn, K. (2016). Lyapunov functions family approach to transient stability assessment. IEEE Transactions on Power Systems, 31 (2), 1269–1277.
- Weitenberg, E. , De Persis, C. , & Monshizadeh, N. (2016). Quantifying the performance of optimal frequency regulators in the presence of intermittent communication disruptions. arXiv:1608.03798v1 [math.OC] 12 Aug 2016 .
- Zao, C. , Mallada, E. , & Dörfler, F . (2015, July). Distributed frequency control for stability and economic dispatch in power networks. Paper presented at The American Control Conference (pp. 2358–22364). Chicago, IL.