Adaptive discrete-time inverse model control using generalized holds

In this paper, an adaptive digital implementation of an inverse model based control scheme for a system with parametric uncertainty is proposed using Generalized Sampling and Hold Functions. The implementation of the control law using this kind of holds allows overcoming the difficulties related to the presence of unstable zeros in the continuous-time model and the usual appearance of unstable discretization zeros in the discrete model when a ZOH is applied. The Generalized Sampling and Hold Functions allows obtaining a discrete model of the plant with all its zeros stable which allows performing an exact inverse model of the plant in comparison to the use of a classical ZOH which only allows, in general, an approximate inversion of the plant. The stability and asymptotic properties of the general adaptive scheme are established. Also, simulation examples showing the scope and application of the method are presented.

[1]  Joachim Rosenthal,et al.  Two-degree-of-freedom l2-optimal tracking with preview , 2004, Autom..

[2]  Aurelio Piazzi,et al.  Using stable input-output inversion for minimum-time feedforward constrained regulation of scalar systems , 2005, Autom..

[3]  K. Watanabe,et al.  Two-degree-of-freedom control with adaptive inverse model , 2004, SICE 2004 Annual Conference.

[4]  Dingguo Chen,et al.  Adaptive Neural Inverse Control Applied to Power Systems , 2006 .

[5]  M. De la Sen,et al.  Model matching via multirate sampling with fast sampled input guaranteeing the stability of the plant zeros : extensions to adaptive control , 2007 .

[6]  B. Paden,et al.  Nonlinear inversion-based output tracking , 1996, IEEE Trans. Autom. Control..

[7]  M. A. Jordan,et al.  Adaptive control of unstable systems based on Kautz expanded inverse model , 1997, 1997 1st International Conference, Control of Oscillations and Chaos Proceedings (Cat. No.97TH8329).

[8]  Manuel de la Sen,et al.  A discrete multi-estimation adaptive control scheme for stabilizing non-inversely stable continuous-time plants using fractional holds , 2007, 2007 46th IEEE Conference on Decision and Control.

[9]  Muhammad Shafiq Internal model control structure using adaptive inverse control strategy. , 2005 .

[10]  M. Ishitobi,et al.  Properties of zeros of discretised system using multirate input and hold , 2004 .

[11]  J. H. Chan On the stabilization of discrete system zeros , 1998 .

[12]  Takuya Sogo,et al.  Inversion of sampled-data system approximates the continuous-time counterpart in a noncausal framework , 2008, Autom..