Abstract
Study of the SISO mixedH 2/l1 problem for discrete time systems showed that there exists a unique optimal solution which can be approximated within any prescribed missing error bound inl 2 norm with solvable suboptimal solutions and solvable superoptimal solutions.
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References
Boyd, S.P., Balakrishnan, V. and Barratt, C.H., 1988. A new CAD method and associate architecture for linear controllers.IEEE Trans. Automat. Contr.,33(3): 268–283.
Cohen, A. and Shaked, U., 1997. Robust discrete-timeH 2 control.International Journal of Control,67(2):213–232.
Conway, J.B., 1990. A Course in Functional Analysis. Springer-Verlag, New York.
Dahleh, M.A., 1992. BIBO stability robustness for coprime factor perturbations.IEEE Trans. Automat. Contr.,37(3):352–355.
Dahleh, M.A. and Kahmmash, M., 1993. Controller design for plants with structured uncertainty.Automatica,29(1):37–56.
Dahleh, M.A. and Diaz-Bobillo, I.J., 1995. Control of Uncertain Systems: A Linear Programming Approach. Prentice Hall, New Jersey.
Doyle, J.C., 1982. Analysis of feedback systems with structured uncertainty.Proceedings of the Institution of Electrical Engineers, Pt D,129(6):242–250.
Elia, N. and Dahleh, M.A., 1997. Controller design with multiple objectives.IEEE Trans. Automat. Contr.,42(5):596–613.
Francis, B.A., 1987. A Course inH ∞ Control Theory. Springer-Verlag, Berlin.
Jacques, D.R. and Ridgely, D.B., 1995. A Fixed-Order, Mixed-Norm Control Synthesis Method for Discrete Linear Systems. Proc. Amer. Contr. Conf., Seattle, p. 1936–1940.
Jacques, D.R., Canfield, R.A. and Ridgely, D.B., 1996. A MATLAB toolbox for fixed-order, mixed-norm control synthesis.IEEE Control Systems Magazine,16 (5):36–43.
Kaminer, I., Khargonekar, P.P. and Rotea, M.A., 1993. MixedH 2/H ∞ control for discrete time systems via convex optimization.Automatica,29(1):57–70.
McDonald, J.S. and Pearson, J.B., 1991.l 1 optimal control of multivariable systems with output norm constraints.Automatica,27(2):317–329.
Salapaka, M. V., Dahleh, M. and Voulgaris, P., 1995a. Mixed Objective Control Synthesis: Optimall 1/H 2 Control Proc. Amer. Contr. Conf., Seattle, p. 1438–1442.
Salapaka, M.V., Dahleh, M. and Voulgaris, P., 1995b. MIMO Optimal Control Design: The Interplay of theH 2 and thel 1 norms. Proc. IEEE Conf. Decision and Control, New Orleans, p. 3682–3687.
Staffans, O.J., 1993. The four-block model matching problem inl 1 and infinite-dimensional linear programming.SIAM J. Contr. Optim.,31(3):747–779.
Voulgaris, P., 1994. OptimalH 2/11 Control: the SISO Case. Proc. IEEE Conf. Decision and Control, Orlando,4:3181–3186.
Voulgaris, P., 1995. OptimalH 2/l1 control via duality theory.IEEE Trans. Automat. Contr,40(11):1881–1888.
Wu, J. and Chu, J., 1996. MixedH 2/l1 Control for Discrete Time Systems. Proc. 13th IFAC Congress, San Francisco,G:453–457.
Wu, J. and Chu, J., 1999. Approximation methods of scalar mixedH 2/l1 problem for discrete time systems.IEEE Trans. Automat. Contr.,44(10):1869–1874.
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Project supported by the National Natural Science Foundation of China (No. 60174026) and the Scientific Research Foundation for Returned Overseas Chinese Scholars of Zhejiang Province (No. J20020546)
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Jun, W., Xie-he, H. & Jian, C. A SISO mixedH2/l1 optimal control problem and its solution. J. Zheijang Univ.-Sci. 5, 68–74 (2004). https://doi.org/10.1631/BF02839315
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DOI: https://doi.org/10.1631/BF02839315