论文信息 - On the Nyquist Envelope of an Interval Plant Family

On the Nyquist Envelope of an Interval Plant Family

In this paper, we study the envelope of the Nyquist plots generated by an interval plant family and show that this boundary is not always contained in the Nyquist plots of the Kharitonov plants. With this motivation, we give a sufficient condition for an envelope point to be contained in the Nyquist plot of a Kharitonov plant and use it to generate large and critical portions of the Nyquist envelope as well as to create a framework for developing new extreme point results for interval feedback systems. This framework is useful in computing the phase margin and the maximal peaking in the sensitivity and complementary sensitivity functions and in stating a robust version of the Circle Criterion. We also use this framework to easily explain existing extreme point results for the gain margin, the H¿ norm and the positive realness of interval plants.

Roberto Tempo | Christopher V. Hollot | R. Tempo | C. Hollot

[1] Shankar P. Bhattacharyya,et al. On robust nonlinear stability of interval control systems , 1991 .

[2] Andrew C. Bartlett. Nyquist, Bode, and Nichols Plots of Uncertain Systems , 1990, 1990 American Control Conference.

[3] M. Fu. Computing the frequency response of linear systems with parametric perturbation , 1990 .

[4] Shankar P. Bhattacharyya,et al. On robust stability of interval control systems , 1991 .

[5] Naresh K. Sinha,et al. Modern Control Systems , 1981, IEEE Transactions on Systems, Man, and Cybernetics.

[6] S. Bhattacharyya,et al. Robust stability against structured and unstructured perturbations , 1989, Proceedings of the 28th IEEE Conference on Decision and Control,.

[7] Christopher V. Hollot,et al. Robust stabilization of interval plants using lead or lag compensators , 1990 .

[8] F. N. Bailey,et al. A Fast Algorithm for Computing Interval Rational Functions , 1988, 1988 American Control Conference.

[10] S. Bhattacharyya,et al. Robust stability under structured and unstructured perturbations , 1990 .

[11] Roberto Tempo,et al. Extreme point results for robust stabilization of interval plants with first-order compensators , 1992 .

[12] Soura Dasgupta,et al. A Kharitonov like theorem for systems under nonlinear passive feedback , 1987, 26th IEEE Conference on Decision and Control.

[13] B. Ghosh. Some new results on the simultaneous stabilizability of a family of single input, single output systems , 1985 .