Multiscale systems, Kalman filters, and Riccati equations

An algorithm analogous to the Rauch-Tung-Striebel algorithm/spl minus/consisting of a fine-to-coarse Kalman filter-like sweep followed by a coarse-to-fine smoothing step/spl minus/was developed previously by the authors (ibid. vol.39, no.3, p.464-78 (1994)). In this paper they present a detailed system-theoretic analysis of this filter and of the new scale-recursive Riccati equation associated with it. While this analysis is similar in spirit to that for standard Kalman filters, the structure of the dyadic tree leads to several significant differences. In particular, the structure of the Kalman filter error dynamics leads to the formulation of an ML version of the filtering equation and to a corresponding smoothing algorithm based on triangularizing the Hamiltonian for the smoothing problem. In addition, the notion of stability for dynamics requires some care as do the concepts of reachability and observability. Using these system-theoretic constructs, the stability and steady-state behavior of the fine-to-coarse Kalman filter and its Riccati equation are analysed. >

[1]  C. Striebel,et al.  On the maximum likelihood estimates for linear dynamic systems , 1965 .

[2]  J. Deyst,et al.  Conditions for asymptotic stability of the discrete minimum-variance linear estimator , 1968 .

[3]  Lennart Ljung,et al.  Two filter smoothing formulae by diagonalization of the Hamiltonian equations , 1982 .

[4]  B. Anderson,et al.  Optimal Filtering , 1979, IEEE Transactions on Systems, Man, and Cybernetics.

[5]  A. Willsky,et al.  Linear estimation of boundary value stochastic processes-- Part I: The role and construction of complementary models , 1984 .

[6]  I. Daubechies Orthonormal bases of compactly supported wavelets , 1988 .

[7]  Stéphane Mallat,et al.  A Theory for Multiresolution Signal Decomposition: The Wavelet Representation , 1989, IEEE Trans. Pattern Anal. Mach. Intell..

[8]  Gregory W. Wornell,et al.  A Karhunen-Loève-like expansion for 1/f processes via wavelets , 1990, IEEE Trans. Inf. Theory.

[9]  A. Benveniste,et al.  Multiscale system theory , 1990, 29th IEEE Conference on Decision and Control.

[10]  Kenneth C. Chou A stochastic modelling approach to multiscale signal processing , 1991 .

[11]  Michèle Basseville,et al.  Modeling and estimation of multiresolution stochastic processes , 1992, IEEE Trans. Inf. Theory.

[12]  Patrick Flandrin,et al.  Wavelet analysis and synthesis of fractional Brownian motion , 1992, IEEE Trans. Inf. Theory.

[13]  A. Willsky,et al.  Kalman filtering and Riccati equations for descriptor systems , 1992 .

[14]  W. Clem Karl,et al.  Multiscale representations of Markov random fields , 1993, IEEE Trans. Signal Process..

[15]  K. C. Chou,et al.  Multiscale recursive estimation, data fusion, and regularization , 1994, IEEE Trans. Autom. Control..