References
- Andrievsky, B. R. , Matveev, A. S. , & Fradkov, A. L. (2010). Control and estimation under information constraints: Toward a unified theory of control, computation and communications. Automation and Remote Control, 71 (4), 572–633.
- Baillieul, J. , & Antsaklis, P. J . (2007). Control and communication challenges in networked real-time systems. Proceedings of the IEEE, 95 (1), 9–28. Special Issue on Technology of Networked Control Systems.
- Bondarko, V. A. (2014). Stabilization of linear systems via a two-way channel under information constraints. Cybernetics and Physics, 3 (4), 157–160.
- Bondarko, V. A. , & Fradkov, A. L. (2016). Adaptive stabilization of linear systems through a two-way channel with limited capacity. IFAC-PapersOnLine, 48 (13), 164–168.
- Fomin, V. N. , Fradkov, A. L. , & Yakubovich, V. A. (1981). Adaptive control of the dynamic plants . Moscow: Nauka. (in Russian).
- Fradkov, A. L. , Andrievsky, B. , & Evans, R. J. (2008). Adaptive observer-based synchronization of chaotic systems with first-order coder in presence of information constraints. IEEE Transactions on Circuits and Systems I, 55 (6), 1685–1694.
- Fridman, E. , & Dambrine, M. (2009). Control under quantization, saturation and delay: An LMI approach. Automatica, 45 , 2258–2264.
- Gusev, S. V. (1989). The finite-convergent algorithm of regression function recovery and its use in problems of adaptive control. Automation and Remote Control, 50(3), 367–374.
- Le Ny, J. , Ribeiro, A. , & Pappas, G. J. (2012). Adaptive communication-constrained deployment of mobile robotic networks. In Proceedings of the 2012 American Control Conference (Vol.1-6, pp. 3742–3747). Montreal, Canada: IEEE.
- Liberzon, D. , & Hespanha, J. P. (2003). Stabilization of nonlinear systems with limited information feedback. IEEE Transactions on Automatic Control, 50 (6), 910–915.
- Matveev, A. S. , & Savkin, A. V. (2004). The problem of LQG optimal control via a limited capacity communication channel. Systems & Control Letters, 53 , 51–64.
- Matveev, A. S. , & Savkin, A. V. (2009). Estimation and control over communication networks. Boston, MA: Birkhauser.
- Nair, G. N. , & Evans, R. J. (2003). Exponential stabilisability of finite-dimensional linear systems with limited data rates. Automatica, 39 , 585–593.
- Nair, G. N. , Fagnani, F. , Zampieri, S. , & Evans, R. J. (2007). Feedback control under data rate constraints: An overview. Proceedings of the IEEE, 95 (1), 108–137.
- Nazin, S. A. , Polyak, B. T. , & Topunov, M. V. (2007). Rejection of bounded exogenous disturbances by the method of invariant ellipsoids. Automation and Remote Control, 68 (3), 467–486.
- Niu, Y. , & Ho, D. W. C. (2014). Control strategy with adaptive quantizer's parameters under digital communication channels. Automatica, 50 (10), 2665–2671.
- Poznyak, A. S. (2015). Robust feedback design for stabilization of nonlinear systems with sampled-data and quantized output: Attractive ellipsoid method. Automation and Remote Control, 76 (5), 834–846.
- Siami, M. , Hayakawa, T. , Ishii, H. , & Tsumuru, K . (2010). Adaptive quantized control for linear uncertain systems over channels subject to packet loss. In Proceedings of the 49th IEEE Conference on Decision and Control (pp. 4655–4660). Atlanta, USA: IEEE.
- Tang, G. , & Guo, L. (2005). Adaptive stabilization of unknown linear systems under communication constraints. In Proceedings of the 24th Chinese Control Conference (Vols. 1–2, pp. 668–672). Guangzhou,China: South China Univ Technology Press.
- Tatikonda, S. , & Mitter, S. (2004). Control under communication constraints. IEEE Transactions on Automatic Control, 49 , 1056–1068.
- Yakubovich, V. A. (1966). Recurrent finite-convergent algorithms to solve the systems of inequalities. Soviet Mathematics – Doklady, 7 , 300–304.
- Yakubovich, V. A. (1970). Finitely convergent algorithms for the solution of countable systems of inequalities and their applications in problems of the synthesis of adaptive systems. Soviet Physics – Doklady, 14 (11), 1051–1054.