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References
G. Chen, M.C. Delfour, A.M. Krall, and G. Payre, Modeling, stabilization and control of serially connected beams, SIAM J. Control Optim., 25, pp. 526–546, 1987.
G. Chen, S.G. Krantz, D.W. Ma, C.E. Wayne, and H.H. West, The Euler-Bernoulli beam equation with boundary energy dissipation, in Operator Methods for Optimal Control Problems, Marcel Dekker, New York, pp. 67–96, 1988.
G. Chen, S.G. Krantz, D.L. Russell, C.E. Wayne, H.H. West and M.P. Coleman, Analysis, design and behavior of dissipative joints for coupled beams, SIAM J. Control Optim., 49, no. 6, pp. 1665–1693, 1989.
R.F. Curtain, Equivalence of input-output stability and exponential stability for infinite dimensional systems, Math. Systems Theory 21, pp.19–48, 1988.
R.F. Curtain, Equivalence of input-output stability and exponential stability, Systems and Control Letters 12, pp. 235–239, 1989.
R.F. Curtain, H. Logemann, S. Townley, H. Zwart, Well-posedness, stabilizability and admissibility for Pritchard Salamon systems, to appear.
L.F. Ho and D.L. Russell, Admissible input elements for systems in Hilbert space and a Carleson measure criterion, SIAM J. Control Optim., 24, pp. 1212–1231, 1986.
F. Huang, Characteristic conditions for exponential stability of linear dynamical systems in Hilbert space, Ann. of Diff. Eqs. 1, pp. 43–56, 1985.
C. A. Jacobson and C. N. Nett, Linear state space systems in infinite dimensional space: the role and characterization of joint stabizability/detectability, IEEE Trans. Autom. Control 33, pp. 541–549, 1988.
K.S. Liu, Energy decay problems in the design of a point stabilizer for coupled string vibratiing systms, SIAM J. Control Optim., 26, no. 6 1348–1356, 1988.
K.S. Liu, F.L. Huang and G. Chen, Exponential stability analysis of a long chain of coupled vibrating strings with dissipative linkage, SIAM J. Appl. Math., 49, no. 6, pp. 1694–1707, 1989.
H. Logemann, On the transfer matrix of a neutral system; characterization of exponential stability in input-output terms, Syst. Contr. Letters 9, pp. 393–400, 1988.
H. Logemann, Transfer-function conditions for the stability of neutral and Volterra integrodifferential systems, IMA J. Math. Control and Information, 3, pp. 9–19, 1986.
H. Logemann and L. Pandolfi, A note on stability and stabilizability of neutral systems, Institut für Dynamische Systems, Report No. 241, March 1991.
J. Prüss, On the spectrum of C 0-semigroups, Trans. Amer. Math. Soc. 284, pp. 847–857, 1984.
R. Rebarber, Spectral assignability for distributed parameter systems with unbounded scalar control, Siam J. Control and Optimization 27, pp. 148–169, 1989.
R. Rebarber, Semigroup generation and stabilization by A p bounded feedback perturbations, Systems and Control Letters, 14, no. 4, 1990.
R. Rebarber, Conditions for the equivalence of internal and external stability for distributed parameter systems, Proceedings of the 30th IEEE Conference on Decision and Control, December, 1991; revised version submitted to IEEE Trans. Autom. Control.
R. Rebarber, Exponential stability of coupled Euler-Bernoulli beams with a dissipative joint, to appear.
D. Salamon, Control and Observation of Neutral Systems, Research Notes in Mathematics 91, Pitman, Boston, 1984.
G. Weiss, Admissible observation operators for linear semigroups, Israel J. Math 65, pp. 17–43, 1989.
G. Weiss, The Representation of Regular Linear Systems on Hilbert Spaces, Proceedings of the Conference on Distributed Parameter Systems, Vorau, Austria, July 1988, Birkhäuser, Basel, 1989.
G. Weiss, Transfer functions of regular linear systems, part I: Characterizations of regularity, to appear in Trans. Amer. Math. Soc.
G. Weiss, Regular linear systems with feedback, to appear.
Y. Yamamoto, Equivalence of internal and external stability for a class of distributed systems, to appear.
Y. Yamamoto and S. Hara, Internal and external stability and robust stability condition for a class of infinite dimensional systems, to appear.
Y. Yamamoto and S. Hara, Relationships between internal and external stability for infinite-dimensional systems with applications to a servo problem, IEEE Trans. Autom. Control 33, pp. 1044–1052, 1988.
J. Zabczyk, A note on C 0-semigroups, Bull. l’Acad. Pol. de Sc. Serie Math., 23 pp. 895–898, 1985.
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© 1993 Springer-Verlag
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Rebarber, R. (1993). Frequency domain methods for proving the uniform stability of vibrating systems. In: Curtain, R.F., Bensoussan, A., Lions, J.L. (eds) Analysis and Optimization of Systems: State and Frequency Domain Approaches for Infinite-Dimensional Systems. Lecture Notes in Control and Information Sciences, vol 185. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0115036
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DOI: https://doi.org/10.1007/BFb0115036
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