References
- Buyukkoroglu, T., Esen, O., & Dzhafarov, V. (2011). Common Lyapunov functions for some special classes of stable systems. IEEE Transactions on Automatic Control, 56, 1963–1967.
- Cheng, D., Guo, L., & Huang, J. (2003). On quadratic Lyapunov functions. IEEE Transactions on Automatic Control, 48, 885–890.
- Danzer, L., Grünbaum, B., & Klee, V. (1963). Helly’s theorem and its relatives. In: Convexity: Proceedings of Symposia in Pure Mathematics (pp. 101–180). American Mathematical Society. Providence, RI.
- Das, S., Abraham, A., & Konar, A. (2008). Particle swarm optimization and differential evolution algorithms: Technical analysis, applications and hybridization perspectives. In Y. Liu, A. Sun, H. Loh, W. Lu, & E.P. Lim (Eds.), Advances of Computational Intelligence in Industrial Systems (Vol. 116, pp. 1–38). Heidelberg: Springer.
- Das, S., & Suganthan, P. (2011). Differential evolution: A survey of the state-of-the-art. IEEE Transactions on Evolutionary Computation, 15, 4–31.
- Del-Valle, Y., Venayagamoorthy, G., Mohagheghi, S., Hernandez, J.C., & Harley, R. (2008). Particle swarm optimization: Basic concepts, variants and applications in power systems. IEEE Transactions on Evolutionary Computation, 12, 171–195.
- Duarte-Mermoud, M.A., Ordóñez-Hurtado, R.H., & Zagalak, P. (2012). A method for determining the non-existence of a common quadratic Lyapunov function for switched linear systems based on particle swarm optimisation. International Journal of Systems Science, 43, 2015–2029.
- Eckhoff, J. (1993). 2.1. Helly, radon, and carathéodory type theorems. In Handbook of convex geometry (Vol. A, pp. 389–448). Amsterdam: North-Holland.
- Fornasini, E., & Valcher, M. (2010). Linear copositive Lyapunov functions for continuous-time positive switched systems. IEEE Transactions on Automatic Control, 55, 1933–1937.
- Gahinet, P., Nemirovskii, A., Laub, A., & Chilali, M. (1994). The LMI control toolbox. In Proceedings of the 33rd IEEE Conference on Decision and Control (Vol. 3, pp. 2038–2041). Lake Buena Vista, FL: IEEE.
- Ibeas, A., & de la Sen, M. (2009). Exponential stability of simultaneously triangularizable switched systems with explicit calculation of a common Lyapunov function. Applied Mathematics Letters, 22, 1549–1555.
- Kameyama, K. (2009). Particle swarm optimization – a survey. IEICE Transactions on Information and Systems, E92-D, 1354–1361.
- King, C., & Nathanson, M. (2006). On the existence of a common quadratic Lyapunov function for a rank one difference. Linear Algebra and its Applications, 419, 400– 416.
- King, C., & Shorten, R. (2006). Singularity conditions for the non-existence of a common quadratic Lyapunov function for pairs of third order linear time invariant dynamic systems. Linear Algebra and its Applications, 413, 24–35.
- Laffey, T.J., & Smigoc, H. (2009). Common Lyapunov solutions for two matrices whose difference has rank one. Linear Algebra and its Applications, 431, 228–240.
- Liberzon, D. (2003). Switching in systems and control: Foundations & Applications Series. Boston, MA: Systems & Control.
- Liberzon, D., & Tempo, R. (2004). Common Lyapunov functions and gradient algorithms. IEEE Transactions on Automatic Control, 49, 990–994.
- Narendra, K., & Balakrishnan, J. (1994). A common Lyapunov function for stable LTI systems with commuting A-matrices. IEEE Transactions on Automatic Control, 39, 2469–2471.
- Ordóñez-Hurtado, R., & Duarte-Mermoud, M. (2012). Finding common quadratic Lyapunov functions for switched linear systems using particle swarm optimisation. International Journal of Control, 85, 12–25.
- Ordóñez Hurtado, R.H., Griggs, W.M., & Shorten, R.N. (2013). On interconnected systems, passivity and some generalisations. International Journal of Control, 86, 2274–2289.
- Shorten, R., & Narendra, K. (1998). On the stability and existence of common Lyapunov functions for stable linear switching systems. In, Proceedings of the 37th IEEE Conference on Decision and Control (Vol. 4, pp. 3723–3724). Tampa, FL: IEEE.
- Shorten, R., & Narendra, K. (2002). Necessary and sufficient conditions for the existence of a common quadratic Lyapunov function for a finite number of stable second order linear time-invariant systems. International Journal of Adaptive Control Signal Process, 16, 709–728.
- Shorten, R., & Narendra, K. (2003). On common quadratic Lyapunov functions for pairs of stable LTI systems whose system matrices are in companion form. IEEE Transactions on Automatic Control, 48, 618–621.
- Singh, J. (2003). The PSO toolbox. Accessed August 2014, http://psotoolbox.sourceforge.net/
- Vesterstrom, J., & Thomsen, R. (2004). A comparative study of differential evolution, particle swarm optimization, and evolutionary algorithms on numerical benchmark problems. In Congress on Evolutionary Computation, 2004. CEC2004 (Vol. 2, pp. 1980–1987). Portland, OR: IEEE.
- Weise, T. (2008). Global optimization algorithms: Theory and application. Accessed August 2014, http://blog.it-weise.de/