Dissipative control for linear systems with time-varying uncertainty

Focuses on linear systems which are subjected to time-varying norm-bounded uncertainties in all matrices. We address the problem of designing a linear feedback controller such that the closed-loop is stable and strictly (Q, S, R)-dissipative for all admissible parameter uncertainties. This problem is referred to as the robust strictly (Q, S, R)-dissipative control. It is shown that a solution to the above problem can be obtained by solving a scaled strictly (Q, S, R)-dissipative control problem for which no parameter uncertainty occurs.

[1]  J. Willems Dissipative dynamical systems Part II: Linear systems with quadratic supply rates , 1972 .

[2]  S. Yuliar,et al.  General dissipative output feedback control for nonlinear systems , 1995, Proceedings of 1995 34th IEEE Conference on Decision and Control.

[3]  A. Isidori,et al.  Passivity, feedback equivalence, and the global stabilization of minimum phase nonlinear systems , 1991 .

[4]  P. S. Bauer Dissipative Dynamical Systems: I. , 1931, Proceedings of the National Academy of Sciences of the United States of America.

[5]  Mitsuji Sampei,et al.  An algebraic approach to H ∞ output feedback control problems , 1990 .

[6]  D. Bernstein,et al.  Robust stabilization with positive real uncertainty: beyond the small gain theory , 1991 .

[7]  Lihua Xie,et al.  H/sub infinity / control and quadratic stabilization of systems with parameter uncertainty via output feedback , 1992 .

[8]  D. Bernstein,et al.  Generalized Riccati equations for the full- and reduced-order mixed-norm H 2 / H ∞ , 1990 .

[9]  A. Schaft L/sub 2/-gain analysis of nonlinear systems and nonlinear state-feedback H/sub infinity / control , 1992 .

[10]  Brian D. O. Anderson,et al.  The small-gain theorem, the passivity theorem and their equivalence , 1972 .

[11]  Wassim Generalized Riccati equations for the full-and reduced-order mixed-norm Hz / H standard problem * , 2022 .

[12]  P. Moylan,et al.  The stability of nonlinear dissipative systems , 1976 .

[13]  B. Anderson,et al.  A first prin-ciples solution to the nonsingular H control problem , 1991 .

[14]  P. Khargonekar,et al.  An algebraic Riccati equation approach to H ∞ optimization , 1988 .

[15]  J. Willems Dissipative dynamical systems part I: General theory , 1972 .

[16]  P. Khargonekar,et al.  Solution to the positive real control problem for linear time-invariant systems , 1994, IEEE Trans. Autom. Control..

[17]  Lihua Xie,et al.  Positive real control problem for uncertain linear time-invariant systems , 1995 .

[18]  P. Khargonekar,et al.  State-space solutions to standard H/sub 2/ and H/sub infinity / control problems , 1989 .

[19]  David J. Hill,et al.  Stability results for nonlinear feedback systems , 1977, Autom..