Hankel-type model reduction for linear repetitive processes: differential and discrete cases

This paper investigates a Hankel-type model reduction problem for linear repetitive processes. Both differential and discrete cases are considered. For a given stable along the pass process, our attention is focused on the construction of a reduced-order stable along the pass process, which guarantees the corresponding error process to have a specified Hankel-type error performance. The Hankel-type performances are first established for differential and discrete linear repetitive processes, respectively, and the corresponding model reduction problems are solved by using the projection approach. Since these obtained conditions are not expressed in linear matrix inequality (LMI) form, the cone complementary linearization (CCL) method is exploited to cast them into sequential minimization problems subject to LMI constraints, which can be solved efficiently. Three numerical examples are provided to demonstrate the proposed theory.

[1]  Krzysztof Galkowski,et al.  Stability and dynamic boundary condition decoupling analysis for a class of 2-D discrete linear systems , 2001 .

[2]  Shengyuan Xu,et al.  H∞ model reduction for discrete-time singular systems , 2003, Syst. Control. Lett..

[3]  E. Rogers,et al.  Stability and control of differential linear repetitive processes using an LMI setting , 2003, IEEE Trans. Circuits Syst. II Express Briefs.

[4]  Karolos M. Grigoriadis,et al.  A Unified Algebraic Approach To Control Design , 1997 .

[5]  James Lam,et al.  Multiplicative Hankel norm approximation of linear multivariable systems , 1993 .

[6]  Huijun Gao,et al.  Hankel norm approximation of linear systems with time-varying delay: continuous and discrete cases , 2004 .

[7]  L. Silverman,et al.  Model reduction via balanced state space representations , 1982 .

[8]  Kemin Zhou,et al.  Frequency-weighted 𝓛∞ norm and optimal Hankel norm model reduction , 1995, IEEE Trans. Autom. Control..

[9]  Eric Rogers,et al.  Stability Analysis for Linear Repetitive Processes , 1992 .

[10]  Lihua Xie,et al.  H/sub /spl infin// reduced-order approximation of 2-D digital filters , 2001 .

[11]  Shoudong Huang,et al.  H8 model reduction for linear time-delay systems: Continuous-time case , 2001 .

[12]  E. Rogers,et al.  LMIs - a fundamental tool in analysis and controller design for discrete linear repetitive processes , 2002 .

[13]  James Lam,et al.  An approximate approach to H2 optimal model reduction , 1999, IEEE Trans. Autom. Control..

[14]  Wojciech Paszke,et al.  Guaranteed cost control of uncertain differential linear repetitive processes , 2004, IEEE Transactions on Circuits and Systems II: Express Briefs.

[15]  E. Rogers,et al.  Predictive optimal iterative learning control , 1998 .

[16]  A. Kummert,et al.  Mixed H2/H∞and robust control of differential linear repetitive processes , 2005, Proceedings of the 44th IEEE Conference on Decision and Control.

[17]  E. Rogers,et al.  H, Control of Differential Linear Repetitive Processes , 2004 .

[18]  P. Gahinet,et al.  A linear matrix inequality approach to H∞ control , 1994 .

[19]  J. Lam,et al.  Optimal weighted L2 model reduction of delay systems , 1999 .

[20]  Huijun Gao,et al.  H ∞ model reduction for discrete time-delay systems: delay-independent and dependent approaches , 2004 .

[21]  B. Moore Principal component analysis in linear systems: Controllability, observability, and model reduction , 1981 .

[22]  James Lam,et al.  H∞ model reduction of Markovian jump linear systems , 2003, Syst. Control. Lett..

[23]  James Lam,et al.  On H2 model reduction of bilinear systems , 2002, Autom..

[24]  Victor Sreeram,et al.  Model reduction of singular systems , 2001, Int. J. Syst. Sci..

[25]  Wei-Yong Yan,et al.  A new approach to frequency weighted L 2 optimal model reduction , 2001 .

[26]  Wojciech Paszke,et al.  H/sub /spl infin// control of differential linear repetitive processes , 2004, Proceedings of the 2004 American Control Conference.

[27]  Shijie Xu,et al.  H∞ model reduction for singular systems: continuous-time case , 2003 .

[28]  K. Glover All optimal Hankel-norm approximations of linear multivariable systems and their L, ∞ -error bounds† , 1984 .

[29]  K. Zhou Frequency-weighted L_∞ nomn and optimal Hankel norm model reduction , 1995 .

[30]  L. Ghaoui,et al.  A cone complementarity linearization algorithm for static output-feedback and related problems , 1997, IEEE Trans. Autom. Control..