Abstract
The aim of this paper is to obtain the uncertain value set in the complex plane for systems with real and complex parameters that are known to lie inside a ball in a weightedl p-norm. It generalizes previously available results and may be used to test the robust stability of polynomials whose coefficients lie in a weighted lp-ball.
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References
F. Bailey and C. Hui, A fast algorithm for computing parametric rational functions,IEEE Trans. Autom. Control, AC-34:1209–1212, 1989.
B. Barmish, New tools for robustness analysis, inProc. 27th IEEE Conf. on Decis. and Control, pp. 1–6, Austin, TX, 1988.
B. Barmish, Generalization of Kharitonov's four-polynomial concept for robust stability problems with linearly dependent coefficient perturbations,IEEE Trans. Autom. Control, AC-34:157–165, 1989.
H. Chapellat, S. Bhattacharyya, and M. Dahleh, Robust stability of a family of disc polynomials,Int. J. Control, 51(6):1353–1362, 1990.
H. Chapellat, S. Bhattacharyya, and L. Keel, Stability margins for Hurwitz polynomials, inProc. 27th IEEE Conf. on Decis. and Control, pp. 1392–1398, 1988.
M. Fu, Computing the frequency response of linear systems with parametric perturbation,Systems and Control Letters, 15:45–52, 1990.
M. Fu, Polytopes of polynomials with zeros in a prescribed region: New criteria and algorithms, in M. Milanese, R. Tempo, and A. Vicino, editors,Robustness in Identification and Control, pp. 125–145, Plenum, New York, 1990.
I. Horowitz, Quantitative feedback theory,Proc. of the Institute of Electr. Engineers, Part D, 129:215–216, 1982.
A. Katbab and E. Jury, On the generalization and comparison of two recent frequency-domain stability robustness results, inProceedings for the American Cont. Conf., pp. 1969–1972, 1991.
J. Kogan, How near is a stable polynomial to an unstable polynomial?IEEE Trans. Circ, and Systems, IT-39:676–680, 1992.
J. Kogan, Robust Hurwitz lp stability of polynomials with complex coefficients,IEEE Trans. Autom. Control, AC-38:1304–1308, 1993.
A. Rantzer and P. Gutman, Algorithm for addition and multiplication of value sets of uncertain transfer function, inProc. IEEE Conf. Decis. and Control, pp. 3056–3057, Brighton, 1991.
W. Sienel, Algorithms for tree structured decomposition, inProc. IEEE Conf. Decis. and Control, pp. 739–740, Tucson, AZ, 1992.
C. Soh, Frequency domain criteria for robust root locations of generalized disc polynomials, in M. Mansour, S. Balemi, and W. Truol, editors,Robustness of Dynamic Systems with Parameter Uncertainties, pp. 23–42, Birkhäuser, Basel, 1992.
C. Soh, G. Berger, and K. Dabke, On the stability properties of polynomials with perturbed coefficients,IEEE Trans. Autom. Control, AC-30:1033–1036, 1985.
R. Tempo, A dual result to Kharitonov's theorem,IEEE Trans. Autom. Control, AC-35:195–198, 1990.
W. Truol and F. Kraus, Computation of value sets of uncertain transfer functions, in M. Mansour, S. Balemi, and W. Truol, editors,Robustness of Dynamic Systems with Parameter Uncertainties, pp. 33–42, Birkhäuser, Basel, 1992.
Y. Tsypkin and B. Polyak, Frequency criteria of linear discrete systems robust stability,Automatika, 4:3–9, 1990.
Y. Z. Tsypkin and B. Polyak, Frequency domain criteria for lp-robust stability of continuous linear systems,IEEE Trans. Autom. Control, AC-36:1464–1469, 1991.
Y. Z. Tsypkin and B. Polyak, Frequency domain criterion for robust stability of polytope of polynomials, in S. Bhattacharyya and L. Keel, editors,Control of Uncertain Dynamic Systems, pp. 491–499, CRC Press, Boca Raton, FL, 1991.
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Pérez, F., Abdallah, C. & Docampo, D. Robustness analysis of polynomials with linearly correlated uncertain coefficients in lp-normed balls. Circuits Systems and Signal Process 15, 543–554 (1996). https://doi.org/10.1007/BF01183161
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DOI: https://doi.org/10.1007/BF01183161