Robust ∞ Filtering of 2D Roesser Discrete Systems: A Polynomial Approach

The problem of robust 𝐻∞ filtering is investigated for the class of uncertain two-dimensional (2D) discrete systems described by a Roesser state-space model. The main contribution is a systematic procedure for generating conditions for the existence of a 2D discrete filter such that, for all admissible uncertainties, the error system is asymptotically stable, and the 𝐻∞ norm of the transfer function from the noise signal to the estimation error is below a prespecified level. These conditions are expressed as parameter-dependent linear matrix inequalities. Using homogeneous polynomially parameter-dependent filters of arbitrary degree on the uncertain parameters, the proposed method extends previous results in the quadratic framework and the linearly parameter-dependent framework, thus reducing its conservatism. Performance of the proposed method, in comparison with that of existing methods, is illustrated by two examples.

[1]  Cishen Zhang,et al.  Hinfinity control and robust stabilization of two-dimensional systems in Roesser models , 2001, Autom..

[2]  T. Hinamoto 2-D Lyapunov equation and filter design based on the Fornasini-Marchesini second model , 1993 .

[3]  M. Kosaka,et al.  Recursive filtering algorithm for a two-dimensional system , 1979 .

[4]  Zhiping Lin,et al.  Robust H Filtering for Uncertain 2-D Continuous Systems , 2005 .

[5]  Huijun Gao,et al.  A delay-dependent approach to robust generalized H2 filtering for uncertain continuous-time systems with interval delay , 2011, Signal Process..

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

[7]  U. Shaked,et al.  H,-OPTIMAL ESTIMATION: A TUTORIAL , 1992 .

[8]  Abdellah Benzaouia,et al.  Stabilization of 2D saturated systems by state feedback control , 2010, Multidimens. Syst. Signal Process..

[9]  Mohammed Alfidi,et al.  LMI Conditions for Robust Stability of 2D Linear Discrete-Time Systems , 2008 .

[10]  Li Xu,et al.  Output feedback stabilizability and stabilization algorithms for 2D systems , 1994, Multidimens. Syst. Signal Process..

[11]  T. Hinamoto Stability of 2-D discrete systems described by the Fornasini-Marchesini second model , 1997 .

[12]  Huijun Gao,et al.  New Design of Robust $H_{\infty}$ Filters for 2-D Systems , 2008, IEEE Signal Processing Letters.

[13]  Panajotis Agathoklis,et al.  Stability and the Lyapunov equation for n-dimensional digital systems , 1997 .

[14]  Huijun Gao,et al.  A new design of robust H2 filters for uncertain systems , 2008, Syst. Control. Lett..

[15]  W. Porter,et al.  State estimation in discrete m-D systems , 1986 .

[16]  A. Hmamed,et al.  Robust stabilization under linear fractional parametric uncertainties of two-dimensional systems with Roesser models , 2008 .

[17]  Andreas Antoniou,et al.  Two-Dimensional Digital Filters , 2020 .

[18]  M.N.S. Swamy,et al.  A new method for computing the stability margin of two-dimensional continuous systems , 2002 .

[19]  A. Habibi Two-dimensional Bayesian estimate of images , 1972 .

[20]  Guang-Ren Duan,et al.  Robust H∞ filter design for 2D discrete systems in Roesser model , 2008, Int. J. Autom. Comput..

[21]  J. Woods,et al.  Kalman filtering in two dimensions: Further results , 1981 .

[22]  Cishen Zhang,et al.  Solutions for H∞ Filtering of Two-Dimensional Systems , 2000, Multidimens. Syst. Signal Process..

[23]  Wojciech Paszke,et al.  Robust H/sub /spl infin// filtering for Uncertain2-D continuous systems , 2005, IEEE Transactions on Signal Processing.

[24]  Lihua Xie,et al.  On the Discrete-time Bounded Real Lemma with application in the characterization of static state feedback H ∞ controllers , 1992 .

[25]  Zhicheng Li,et al.  Further results on H∞ filtering for discrete‐time systems with state delay , 2011 .

[26]  JOHN w. WOODS,et al.  Kalman filtering in two dimensions , 1977, IEEE Trans. Inf. Theory.

[27]  Lihua Xie,et al.  H∞ estimation for uncertain systems , 1992 .

[28]  Lihua Xie,et al.  H∞ filtering of 2-D discrete systems , 2000, IEEE Trans. Signal Process..