On the State Space and Dynamics Selection in Linear Stochastic Models: A Spectral Factorization Approach

Matrix spectral factorization is traditionally described as finding spectral factors having a fixed analytic pole configuration. The classification of spectral factors then involves studying the solutions of a certain algebraic Riccati equation, which parametrizes their zero structure. The pole structure of the spectral factors can also be parametrized in terms of solutions of another Riccati equation. We study these two Riccati equations and describe how they can be combined for the construction of general spectral factors, which involve both zero and pole flipping on an arbitrary reference spectral factor.

[1]  Daniele Alpago,et al.  Families of solutions of algebraic Riccati equations , 2018, Syst. Control. Lett..

[2]  G. Picci,et al.  Silverman algorithm and the structure of discrete-time stochastic systems☆ , 2002 .

[3]  B. Anderson The inverse problem of stationary covariance generation , 1969 .

[4]  Giorgio Picci,et al.  Representation and Factorization of Discrete-Time Rational All-Pass Functions , 2015, IEEE Transactions on Automatic Control.

[5]  P. Whittle ON STATIONARY PROCESSES IN THE PLANE , 1954 .

[6]  Michele Pavon,et al.  Time and Spectral Domain Relative Entropy: A New Approach to Multivariate Spectral Estimation , 2011, IEEE Transactions on Automatic Control.

[7]  Giacomo Baggio,et al.  On Minimal Spectral Factors With Zeroes and Poles Lying on Prescribed Regions , 2016, IEEE Transactions on Automatic Control.

[8]  M. Pavon,et al.  Parametrization of all minimal square spectral factors , 1993 .

[9]  Charles R. Johnson,et al.  Matrix analysis , 1985, Statistical Inference for Engineers and Data Scientists.

[10]  Tryphon T. Georgiou,et al.  Optimal Estimation With Missing Observations via Balanced Time-Symmetric Stochastic Models , 2015, IEEE Transactions on Automatic Control.

[11]  A. Ferrante A parameterization of minimal stochastic realizations , 1994, IEEE Trans. Autom. Control..

[12]  Mattia Zorzi,et al.  Multivariate Spectral Estimation Based on the Concept of Optimal Prediction , 2014, IEEE Transactions on Automatic Control.

[13]  Tryphon T. Georgiou,et al.  Spectral analysis based on the state covariance: the maximum entropy spectrum and linear fractional parametrization , 2002, IEEE Trans. Autom. Control..

[14]  Tryphon T. Georgiou Relative entropy and the multivariable multidimensional moment problem , 2006, IEEE Transactions on Information Theory.

[15]  Mattia Zorzi,et al.  Rational approximations of spectral densities based on the Alpha divergence , 2013, Math. Control. Signals Syst..

[16]  Giorgio Picci,et al.  Acausal models and balanced realizations of stationary processes , 1994 .

[17]  Harald K. Wimmer A Parametrization of Solutions of the Discrete-time Algebraic Riccati Equation Based on Pairs of Opposite Unmixed Solutions , 2006, SIAM J. Control. Optim..

[18]  Mattia Zorzi,et al.  A New Family of High-Resolution Multivariate Spectral Estimators , 2012, IEEE Transactions on Automatic Control.

[19]  G. Picci,et al.  Linear Stochastic Systems: A Geometric Approach to Modeling, Estimation and Identification , 2016 .

[20]  J. Willems Least squares stationary optimal control and the algebraic Riccati equation , 1971 .

[21]  G. Picci,et al.  On the Stochastic Realization Problem , 1979 .

[22]  Giacomo Baggio,et al.  On the Factorization of Rational Discrete-Time Spectral Densities , 2014, IEEE Transactions on Automatic Control.

[23]  M. A. Kaashoek,et al.  Minimal Factorization of Matrix and Operator Functions , 1980 .