Finite spectrum assignment and observer for multivariable systems with commensurate delays

This paper is concerned with control of multivariable systems with commensurate delays. The purpose of this paper is to enlarge the class of finite spectrum assignable systems to spectrally controllable multivariable systems with commensurate delays. By overcoming an infinite number of eigenvalues which are contained in the system and make control very complex, it is proved that if the system is spectrally controllable, there is a delayed feedback matrix such that the closed-loop system is spectrally controllable through a single input. Combining this result with previous ones about single-input systems, it is verified that spectral controllability is equivalent to finite spectrum assignability for multivariable systems with commensurate delays. An observer for the system with delayed outputs is presented. By using these results, the multivariable system can be regulated as desired without preliminary knowledge of open-loop eigenvalues and a stability test of transcendental functions whenever the system is spectrally controllable and spectrally observable.

[1]  W. Wonham,et al.  On pole assignment in multi-input controllable linear systems , 1967, IEEE Transactions on Automatic Control.

[2]  Hirokazu Mayeda,et al.  On the Stabilizability of Linear Systems with Delays , 1975 .

[3]  A. Stephen Morse Ring models for delay-differential systems , 1976, Autom..

[4]  H. Koivo,et al.  Modal characterizations of controllability and observability in time delay systems , 1976 .

[5]  Eduardo Sontag Linear Systems over Commutative Rings. A Survey , 1976 .

[6]  H. Koivo,et al.  An observer theory for time delay systems , 1976 .

[7]  Edward W. Kamen,et al.  An operator theory of linear functional differential equations , 1978 .

[8]  R. Triggiani,et al.  Function Space Controllability of Linear Retarded Systems: A Derivation from Abstract Operator Conditions , 1978 .

[9]  A. Olbrot Stabilizability, detectability, and spectrum assignment for linear autonomous systems with general time delays , 1978 .

[10]  A. Olbrot,et al.  Finite spectrum assignment problem for systems with delays , 1979 .

[11]  D. Salamon Observers and duality between observation and state feedback for time delay systems , 1980 .

[12]  M. Spong,et al.  On the spectral controllability of delay-differential equations , 1981 .

[13]  Pramod P. Khargonekar,et al.  On the relation between stable matrix fraction factorizations and regulable realizations of linear systems over rings , 1981, CDC 1981.

[14]  Stanislaw Zak,et al.  On spectrum placement for linear time invariant delay systems , 1981, 1981 20th IEEE Conference on Decision and Control including the Symposium on Adaptive Processes.

[15]  Pramod P. Khargonekar On Matrix Fraction Representations for Linear Systems over Commutative Rings , 1982 .

[16]  A. Olbrot,et al.  On reachability over polynomial rings and a related genericity problem , 1982 .

[17]  E. Emre,et al.  On Necessary and Sufficient Conditions for Regulation of Linear Systems Over Rings , 1982 .

[18]  Pramod P. Khargonekar,et al.  Regulation of split linear systems over rings: Coefficient-assignment and observers , 1982 .

[19]  E. W. Kamen,et al.  Linear systems with commensurate time delays: stability and stabilization independent of delay , 1982 .

[20]  Masami Ito,et al.  Finite spectrum assignment problem for systems with multiple commensurate delays in state variables , 1983 .

[21]  K. Watanabe,et al.  Finite spectrum assignment problem for systems with delay in state variables , 1983 .

[22]  Masami Ito,et al.  Finite spectrum assignment problem of systems with multiple commensurate delays in states and control , 1984 .

[23]  S. Żak,et al.  Dynamic compensation of SISO systems over a principal ideal domain , 1984 .

[24]  Keiji Watanabe Further study of spectral controllability of systems with multiple commensurate delays in state variables , 1984 .

[25]  Pramod P. Khargonekar,et al.  On the control of linear systems whose coefficients are functions of parameters , 1984 .

[26]  D. Salamon On controllability and observability of time delay systems , 1984 .

[27]  A. Manitius Feedback controllers for a wind tunnel model involving a delay: Analytical design and numerical simulation , 1984 .

[28]  Keiji Watanabe,et al.  A necessary condition for spectral controllability of delay systems on basis of finite Laplace transforms , 1984 .

[29]  Keiji Watanabe,et al.  An observer of systems with delays in state variables , 1985 .

[30]  V. Manousiouthakis,et al.  On spectral controllability of multi-input time-delay systems☆ , 1985 .