Algebraic theory of linear multivariable feedback systems

This paper presents an algebraic theory for analysis and design of linear multivariable feedback systems. The theory is developed in an algebraic setting sufficiently general to include, as special cases, continuous and discrete time systems, both lumped and distributed. Designs are implemented by construction of a controller with two vector inputs and one vector output. Use of controllers of this type is shown to generate convenient stability results, and convenient global parametrizations of all I/O maps and all disturbance-to-output maps achievable, for a given plant, by a stabilizing compensator. These parametrizations are then used to show that any such I/O map and any such disturbance-to-output map may be simultaneously realized by choice of an appropriate controller. In the special case of lumped systems, it is shown that the design theory. can be reduced to manipulations involving polynomial matrices only. The resulting design procedure is thus shown to be more efficient computationally. Finally, the problem of asymptotically tracking a class of input signals is considered in the general algebraic setting. It is shown that the classical results on asymptotic tracking can be generalized to this setting. Additionally, sufficient conditions for robustness of asymptotic tracking, and robustness of stability are developed.

[1]  Dante C. Youla,et al.  Modern Wiener-Hopf Design of Optimal Controllers. Part I , 1976 .

[2]  E. Davison The robust control of a servomechanism problem for linear time-invariant multivariable systems , 1976 .

[3]  J. Pearson,et al.  Frequency domain synthesis of multivariable linear regulators , 1977, 1977 IEEE Conference on Decision and Control including the 16th Symposium on Adaptive Processes and A Special Symposium on Fuzzy Set Theory and Applications.

[4]  C. Desoer,et al.  An algebra of transfer functions for distributed linear time-invariant systems , 1978 .

[5]  M. Vidyasagar On the use of right-coprime factorizations in distributed feedback systems containing unstable subsystems , 1978 .

[6]  Karl Johan Åström,et al.  Robustness of a design method based on assignment of poles and zeros , 1980 .

[7]  C. Desoer,et al.  Feedback system design: The fractional representation approach to analysis and synthesis , 1979, 1979 18th IEEE Conference on Decision and Control including the Symposium on Adaptive Processes.

[8]  F. Callier,et al.  Simplifications and clarifications on the paper 'An algebra of transfer functions for distributed linear time-invariant systems' , 1980 .

[9]  C. Desoer,et al.  Linear Time-Invariant Robust Servomechanism Problem: A Self-Contained Exposition , 1980 .

[10]  J. B. Pearson,et al.  Synthesis of Linear Multivariable Regulators , 1980 .

[11]  G. Stein,et al.  Multivariable feedback design: Concepts for a classical/modern synthesis , 1981 .

[12]  J. Cruz,et al.  RELATIONSHIP BETWEEN SENSITIVITY AND STABILITY OF MULTIVARIABLE FEEDBACK SYSTEMS. , 1981 .

[13]  L. Pernebo An algebraic theory for design of controllers for linear multivariable systems--Part I: Structure matrices and feedforward design , 1981 .

[14]  J. Edmunds,et al.  Principal gains and principal phases in the analysis of linear multivariable feedback systems , 1981 .

[15]  C. Desoer,et al.  Design of multivariable feedback systems with stable plant , 1981 .

[16]  G. Zames Feedback and optimal sensitivity: Model reference transformations, multiplicative seminorms, and approximate inverses , 1981 .

[17]  Charles A. Desoer,et al.  Discrete time convolution control systems , 1982 .

[18]  Alberto L. Sangiovanni-Vincentelli,et al.  Computer-aided design via optimization : A review , 1982, Autom..

[19]  J. Murray,et al.  Fractional representation, algebraic geometry, and the simultaneous stabilization problem , 1982 .

[20]  Charles A. Desoer,et al.  Controller Design for Linear Multivariable Feedback Systems with Stable Plants, Using Optimization with Inequality Constraints , 1983 .

[21]  Charles A. Desoer,et al.  Design of multivariable feedback systems with simple unstable plant , 1984 .