المؤلفون: Germani, Alfredo, Manes, Costanzo, Pepe, Pierdomenico

مصطلحات موضوعية: keyword:nonlinear system, keyword:time-delay system, keyword:observability, msc:93B07, msc:93C10, msc:93C23

وصف الملف: application/pdf

العلاقة: mr:MR1859096; zbl:Zbl 1265.93029; reference:[1] Banks H. T., Kappel F.: Spline approximations for functional differential equations.J. Differential Equations 34 (1979), 496–522 Zbl 0422.34074, MR 0555324, 10.1016/0022-0396(79)90033-0; reference:[2] Bensoussan A., Prato G. Da, Delfour M. C., Mitter S. K.: Representation and control of Infinite Dimensional Systems.Birkhauser, Boston 1992 Zbl 1117.93002, MR 2273323; reference:[3] Ciccarella G., Mora, M. Dalla, Germani A.: A Luenberger-like observer for nonlinear systems.Internat. J. Control 57 (1993), 3, 537–556 Zbl 0772.93018, MR 1205006, 10.1080/00207179308934406; reference:[4] Mora M. Dalla, Germani, A., Manes C.: Design of state observers from a drift-observability property.IEEE Trans. Automat. Control 45 (2000), 6, 1536–1540 MR 1797411, 10.1109/9.871767; reference:[5] Dambrine M., Goubet, A., Richard J. 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الإتاحة: http://hdl.handle.net/10338.dmlcz/135421Test

المؤلفون: Germani, Alfredo, Manes, Costanzo, Pepe, Pierdomenico

مصطلحات موضوعية: keyword:nonlinear delay system, keyword:state delayed feedback, msc:93C10, msc:93C23, msc:93D05, msc:93D15, msc:93D25

وصف الملف: application/pdf

العلاقة: mr:MR1760886; zbl:Zbl 1249.93146; reference:[1] Banks H. T., Kappel F.: Spline approximations for functional differential equations.J. Differential Equations 34 (1979), 496–522 Zbl 0422.34074, MR 0555324, 10.1016/0022-0396(79)90033-0; reference:[2] Bensoussan A., Prato G. Da, Delfour M. C., Mitter S. K.: Representation and Control of Infinite Dimensional Systems.Birkhäuser, Boston 1992 Zbl 1117.93002, MR 2273323; reference:[3] Germani A., Manes C., Pepe P.: Numerical solution for optimal regulation of stochastic hereditary systems with multiple discrete delays.In: Proc. of 34th IEEE Conference on Decision and Control, Louisiana 1995. Vol. 2, pp. 1497–1502; reference:[4] Germani A., Manes C., Pepe P.: Linearization of input–output mapping for nonlinear delay systems via static state feedback.In: Proc. of CESA IMACS Multiconference on Computational Engineering in Systems Applications, Lille 1996, Vol. 1, pp. 599–602; reference:[5] Germani A., Manes C., Pepe P.: Linearization and decoupling of nonlinear delay systems.In: Proc. of 1998 American Control Conference, ACC’98, Philadelphia 1998, Vol. 3, pp. 1948–1952; reference:[6] Germani A., Manes C., Pepe P.: Tracking, model matching, disturbance decoupling for a class of nonlinear delay systems.In: Proc. of Large Scale Systems IFAC Conference, LSS’98, Patrasso 1998, Vol. 1, pp. 423–429; reference:[7] Germani A., Manes C., Pepe P.: A state observer for nonlinear delay systems.In: Proc. of 37th IEEE Conference on Decision and Control, Tampa 1998; reference:[8] Gibson J. S.: Linear quadratic optimal control of hereditary differential systems: Infinite–dimensional Riccati equations and numerical approximations.SIAM J. Control Optim. 31 (1983), 95–139 Zbl 0557.49017, MR 0688442, 10.1137/0321006; reference:[9] Isidori A.: Nonlinear Control Systems.Third edition. Springer–Verlag, London 1995 Zbl 0931.93005, MR 1410988; reference:[10] Lehman B., Bentsman J., Lunel S. V., Verriest E. I.: Vibrational control of nonlinear time lag systems with bounded delay: Averaging theory, stabilizability, and transient behavior.IEEE Trans. Automat. Control 5 (1994), 898–912 Zbl 0813.93044, MR 1274337, 10.1109/9.284867; reference:[11] Marquez L. A., Moog C. H., Velasco M.: The structure of nonlinear time delay system.In: Proc. of 6th Mediterranean Conference on Control and Automation, Alghero 1998; reference:[12] Moog C. H., Castro R., Velasco M.: The disturbance decoupling problem for nonlinear systems with multiple time–delays: Static state feedback solutions.In: Proc. of CESA IMACS Multiconference on Computational Engineering in Systems Applications, Vol. 1, pp. 596–598, Lille 1996; reference:[13] Moog C. H., Castro R., Velasco M.: Bi–causal solutions to the disturbance decoupling problem for time–delay nonlinear systems.In: Proc. of 36th IEEE Conference on Decision and Control, Vol. 2, pp. 1621–1622, San Diego, 1997; reference:[14] Pandolfi L.: The standard regulator problem for systems with input delays.An approach through singular control theory. Appl. Math. Optim. 31 (1995), 2, 119–136 Zbl 0815.49006, MR 1309302, 10.1007/BF01182784; reference:[15] Pepe P.: Il Controllo LQG dei Sistemi con Ritardo.PhD Thesis, Department of Electrical Engineering, L’Aquila 1996; reference:[16] Wu J. W., Hong K.-S.: Delay–independent exponential stability criteria for time–varying discrete delay systems.IEEE Trans. Automat. Control 39 (1994), 4, 811–814 Zbl 0807.93055, MR 1276779, 10.1109/9.286258

الإتاحة: http://hdl.handle.net/10338.dmlcz/135332Test