论文信息 - New formulations for quantitative feedback theory

New formulations for quantitative feedback theory

New formulations are presented for quantitative feedback theory that do not require the direct manipulation of templates in the classical sense. This enables the explicit incorporation of high-frequency unstructured uncertainty into the problem statement, and allows for constructive existence conditions for the solvability of the QFT problem. Necessary and sufficient conditions for robust stability and robust performance are presented for plants with both parametric and high-frequency unstructured uncertainty, that parallel their corresponding H∞ counterparts. This work extends the recent contribution of Jayasuriya and Zhao to plants with more general non-minimum phase characteristics such as RHP poles and zeros and time delays.

[1] I. Horowitz,et al. Optimum synthesis of non-minimum phase feedback systems with plant uncertainty† , 1978 .

[2] Suhada Jayasuriya,et al. Stability of quantitative feedback designs and the existence of robust QFT controllers , 1994 .

[3] K. R. Krishnan,et al. Frequency-domain design of feedback systems for specified insensitivity of time-domain response to parameter variation , 1977 .

[4] J. Freudenberg,et al. Frequency Domain Properties of Scalar and Multivariable Feedback Systems , 1988 .

[5] Bruce A. Francis,et al. Feedback Control Theory , 1992 .

[6] H. W. Bode,et al. Network analysis and feedback amplifier design , 1945 .

[7] On the stability of linear composite systems with delays , 1983 .

[8] I. Horowitz. Invited paper Survey of quantitative feedback theory (QFT) , 1991 .

[9] B. Francis,et al. A Course in H Control Theory , 1987 .

[10] Allan M. Krall,et al. Stability techniques for continuous linear systems , 1965 .

[11] Suhada Jayasuriya,et al. Parametric Robust Control by Quantitative Feedback Theory , 1991, 1991 American Control Conference.