access icon free Multi-stage control strategy for quantised feedback control systems

© The Institution of Engineering and Technology
Received 28/09/2011, Accepted 22/01/2013, Revised 22/11/2012, Published

This study establishes a multi-stage control strategy that can systematically reduce the effect of quantisation errors without resort to any prescribed control gains applicable to the stabilisation of quantisation-free systems. First of all, a two-stage control strategy is built under a fixed quantisation sensitivity, and then a multi-stage control strategy is established on the possibility of adjusting on-line the quantisation sensitivity. In the derivation, the overall control law is constructed with linear and non-linear feedback controls, where non-linear feedback control plays an important role of eliminating the effect of control input quantisation errors.

Inspec keywords: quantisation (signal); stability; nonlinear control systems; feedback

Other keywords: stabilisation; multistage control strategy; quantised feedback control systems; overall control law; fixed quantisation sensitivity; control input quantisation errors; two-stage control strategy; nonlinear feedback control; quantisation-free systems; prescribed control gains

Subjects: Stability in control theory; Signal processing theory; Nonlinear control systems

References

    1. 1)
      • 11. Choi, Y.J., Yun, W., Park, P.: ‘Asymptotic stabilization of a system with a finite-level logarithmic quantiser’, Electron. Lett., 2008, 44, (19), pp. 11171119 (doi: 10.1049/el:20081492).
    2. 2)
      • 5. Liberzon, D.: ‘Hybrid feedback stabilization of systems with quantized signals’, Automatica, 2003, 39, (9), pp. 15431554 (doi: 10.1016/S0005-1098(03)00151-1).
    3. 3)
      • 16. EGhaoui, L.l., Oustry, F., Ait Rami, M.: ‘A cone complementarity linearization algorithms for static output-feedback and related problems’, IEEE Trans. Autom. Control, 1997, 42, pp. 11711176 (doi: 10.1109/9.618250).
    4. 4)
      • 17. Hu, T., Lin, Z.: ‘Control systems with actuator saturation: analysis and design’ Vol. XVI (Birkhäuser, Boston, 2001), 392p.
    5. 5)
      • 10. Park, P., Choi, J., Yun, S.W.: ‘Eliminating effect of input quantisation in linear systems’, Electron. Lett., 2008, 44, (7), pp. 456457 (doi: 10.1049/el:20080002).
    6. 6)
      • 15. Zhai, G., Matsumoto, Y., Chen, X., imae, J., Kobayashi, T.: ‘Hybrid stabilization of discrete-time LTI systems with two quantized signals’, Int. J. Appl. Math. Comput. Sci., 2005, 15, (4), pp. 509516.
    7. 7)
      • 12. Fridman, E., Dambrine, M.: ‘Control under quantization, saturation and delay: an LMI approach’, Automatica, 2009, 45, (10), pp. 22582264 (doi: 10.1016/j.automatica.2009.05.020).
    8. 8)
      • 19. Kwakernaak, H., Sivan, R.: ‘Linear optimal control systems’ (Wiley-Interscience, New York, 1972).
    9. 9)
      • 1. Yeh, T.-J., Lu, N.-S.: ‘Framework for reducing digital-to-analogue converter quantisation error in servo control systems’, IET Control Theory Appl., 2008, 2, (8), pp. 693705 (doi: 10.1049/iet-cta:20070165).
    10. 10)
      • 18. Raković, S.V., Kerrigan, E.C., Kouramas, K.I., Mayne, D.Q.: ‘Invariant approximations of the minimal robust positively invariant set’, IEEE Trans. Autom. Control, 2005, 50, (3), pp. 406410 (doi: 10.1109/TAC.2005.843854).
    11. 11)
      • 13. Zhang, J., Lam, J., Xia, Y.: ‘Observer-based output feedback control for discrete systems with quantised inputs’, IET Control Theory Applic., 2011, 5, (3), pp. 478485 (doi: 10.1049/iet-cta.2010.0148).
    12. 12)
      • 7. Liberzon, D., Nešić, D.: ‘Input-to-state stabilization of linear systems with quantized state measurements’, IEEE Trans. Autom. Control, 2007, 52, (5), pp. 767781 (doi: 10.1109/TAC.2007.895850).
    13. 13)
      • 8. Che, W.-W., Yang, G.-H.: ‘Quantized H control for discrete-time systems’. IEEE Multi-Conf. Systems and Control, Singapore, 2007.
    14. 14)
      • 14. Cepeda, A., Astolfi, A.: ‘Control of a planar system with quantized and saturated input/output’, IEEE Trans. Circuits Syst. I, Regul. Pap., 2008, 55, (3), pp. 932942 (doi: 10.1109/TCSI.2008.916448).
    15. 15)
      • 2. Lam, H.K.: ‘Sampled-data fuzzy-model-based control systems: stability analysis with consideration of analogue-to-digital converter and digital-to-analogue converter’, IET Control Theory Applic., 2010, 4, (7), pp. 11311144 (doi: 10.1049/iet-cta.2008.0599).
    16. 16)
      • 4. Corradini, M.L., Orlando, G.: ‘Robust quantized feedback stabilization of linear systems’, Automatica, 2008, 44, pp. 24582462 (doi: 10.1016/j.automatica.2008.01.027).
    17. 17)
      • 6. Liberzon, D., Nesic, D.: ‘Input-to-state stabilization of linear systems with quatized feedback’. 44th IEEE Conf. Decision and Control and European Control Conf. (CDC-ECC’05), 2005, pp. 81978202.
    18. 18)
      • 9. Tian, E., Yue, D., Zhao, X.: ‘Quantised control design for networked control systems’, IET Control Theory Applic., 2007, 1, (6), pp. 16931699 (doi: 10.1049/iet-cta:20060499).
    19. 19)
      • 3. Roger Brockett, W., Liberzon, D.: ‘Quantized feedback stabilization of linear systems’, IEEE Trans. Inf. Theory, 2000, 45, pp. 12791288.
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