[Al’brekht, E.G. (1961). On the optimal stabilization of nonlinear systems, Journal of Applied Mathematics and Mechanics25(5): 1254–1266.10.1016/0021-8928(61)90005-3]Search in Google Scholar
[Aranda-Escolástico, E., Salt, J., Guinaldo, M., Chacón, J. and Dormido, S. (2018). Optimal control for aperiodic dual-rate systems with time-varying delays, Sensors18(5): 1–19.10.3390/s18051491598257529747441]Search in Google Scholar
[Bemporad, A., Torrisit, F.D. and Morarit, M. (2000). Performance analysis of piecewise linear systems and model predictive control systems, IEEE Conference on Decision and Control, Sydney, NSW, Australia, pp. 4957–4962.]Search in Google Scholar
[Boyd, S., El-Ghaoui, L., Feron, E. and Balakrishnan, V. (1994). Linear Matrix Inequalities in System and Control Theory, SIAM, Philadelphia, PA.10.1137/1.9781611970777]Search in Google Scholar
[Buhl, M. and Lohmann, B. (2009). Control with exponentially decaying Lyapunov functions and its use for systems with input saturation, European Control Conference, Budapest, Hungary, pp. 3148–3153.10.23919/ECC.2009.7074889]Search in Google Scholar
[Darup, M.S. and Mönnigmann, M. (2013). Null-controllable set computation for a class of constrained bilinear systems, European Control Conference, Zürich, Switzerland, pp. 2758–2763.]Search in Google Scholar
[Duda, J. (2012). A Lyapunov functional for a system with a time-varying delay, International Journal of Applied Mathematics and Computer Science22(2): 327–337, DOI: 10.2478/v10006-012-0024-7.10.2478/v10006-012-0024-7]Open DOISearch in Google Scholar
[Feyzmahdavian, H. R., Charalambous, T. and Johansson, M. (2013). On the rate of convergence of continuous-time linear positive systems with heterogeneous time-varying delays, European Control Conference, Zürich, Switzerland, pp. 3372–3377.10.23919/ECC.2013.6669345]Search in Google Scholar
[Fu, J. (1993). Families of Lyapunov functions for nonlinear systems in critical cases, IEEE Transactions on Automatic Control38(1): 3–16.10.1109/9.186308]Search in Google Scholar
[Grushkovskaya, V. and Zuyev, A. (2014). Optimal stabilization problem with minimax cost in a critical case, IEEE Transactions on Automatic Control59(9): 2512–2517.10.1109/TAC.2014.2304399]Search in Google Scholar
[Hu, T., Lin, Z. and Shamash, Y. (2003). On maximizing the convergence rate for linear systems with input saturation, IEEE Transactions on Automatic Control48(7): 1249–1253.10.1109/TAC.2003.814271]Search in Google Scholar
[Kaczorek, T. (2007). The choice of the forms of Lyapunov functions for a positive 2D Roesser model, International Journal of Applied Mathematics and Computer Science17(4): 471–475, DOI: 10.2478/v10006-007-0039-7.10.2478/v10006-007-0039-7]Open DOISearch in Google Scholar
[Lenka, B.K. (2019). Time-varying Lyapunov functions and Lyapunov stability of nonautonomous fractional order systems, International Journal of Applied Mathematics32(1): 111–130.10.12732/ijam.v32i1.11]Search in Google Scholar
[Li, W., Huang, C. and Zhai, G. (2018). Quadratic performance analysis of switched affine time-varying systems, International Journal of Applied Mathematics and Computer Science28(3): 429–440, DOI: 10.2478/amcs-2018-0032.10.2478/amcs-2018-0032]Open DOISearch in Google Scholar
[Polyak, B. and Shcherbakov, P. (2009). Ellipsoidal approximations to attraction domains of linear systems with bounded control, Proceedings of the American Control Conference, St. Louis, MO, USA, pp. 5363–5367.10.1109/ACC.2009.5160175]Search in Google Scholar
[Prieur, C., Tarbouriech, S. and Zaccarian, L. (2011). Improving the performance of linear systems by adding a hybrid loop, 18th IFAC World Congress, Milan, Italy, pp. 6301–6306.10.3182/20110828-6-IT-1002.02717]Search in Google Scholar
[Scokaert, P. and Rawlings, J.B. (1998). Constrained linear quadratic regulation, IEEE Transactions on Automatic Control43(8): 1163–1169.10.1109/9.704994]Search in Google Scholar
[Selek, I. and Ikonen, E. (2018). On the bounds of the fastest admissible decay of generalized energy in controlled LTI systems subject to state and input constraints, 15th International Conference on Electrical Engineering, Computing Science and Automatic Control (CCE2018), Mexico City, Mexico, p. ID:19.10.1109/ICEEE.2018.8533983]Search in Google Scholar