Robust stabilizability for linear systems with both parameter variation and unstructured uncertainty

This paper considers the problem of finding one compensator which stabilizes a plant having both parameter variation and high frequency unstructured uncertainty. A new uncertain system model is proposed to characterize plants containing those two different uncertainties. Closed loop stability criterion is then derived for the new model. To obtain the desired results, number of assumptions describing the set of allowable plants are imposed. The satisfaction of these assumptions guarantees the existence of a proper stabie compensator C(s) achieving robust stabilization. The algorithm used for controller design has some most attractive features: Namely, it is recursive in nature and allows the designer to select one compensator coefficient at a time. Also, the construction of the compensator depends on the difference between the orders of numerator and denominator polynomials of the nominal plant and often leads to a lower order compensator.

[1]  R. V. Patel,et al.  Robustness of linear quadratic state feedback designs in the presence of system uncertainty. [application to Augmentor Wing Jet STOL Research Aircraft flare control autopilot design] , 1977 .

[2]  J. Ackermann Parameter space design of robust control systems , 1980 .

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

[4]  Charles A. Desoer,et al.  Necessary and sufficient condition for robust stability of linear distributed feedback systems , 1982 .

[5]  M. Vidyasagar,et al.  Algebraic design techniques for reliable stabilization , 1982 .

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

[7]  H. Kwakernaak A condition for robust stabilizability , 1982 .

[8]  G. Zames,et al.  Feedback, minimax sensitivity, and optimal robustness , 1983 .

[9]  J. Pearson,et al.  Optimal disturbance reduction in linear multivariable systems , 1983, The 22nd IEEE Conference on Decision and Control.

[10]  H. Kimura Robust stabilizability for a class of transfer functions , 1983, The 22nd IEEE Conference on Decision and Control.

[11]  G. Zames,et al.  H ∞ -optimal feedback controllers for linear multivariable systems , 1984 .

[12]  R. Yedavalli Perturbation bounds for robust stability in linear state space models , 1985 .

[13]  B. Barmish,et al.  On making a polynomial Hurwitz invariant by choice of feedback gains , 1985, 1985 24th IEEE Conference on Decision and Control.

[14]  Mathukumalli Vidyasagar,et al.  Robust controllers for uncertain linear multivariable systems , 1984, Autom..

[15]  B. Ross Barmish,et al.  An iterative design procedure for simultaneous stabilization of MIMO systems , 1987, Autom..