Optimal Control Theory for the Damping of Vibrations of Simple Elastic Systems

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Smart Mater. Al-Saggaf, U. Model reduction via balanced realizations: an extension and frequency weighting techniques. IEEE Trans. Bailey, T. Distributed piezoelectric polymer active vibration control of cantilever beam. AIAA J.

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Control Dyn. Bahar, L. State space approach to elasticity. J Franklin I. Balamurugan V. Active vibration control of piezolaminated smart beams Def. Bendary, I. Elshafei, M. Finite element model of smart beams with distributed piezoe-lectric actuators. Struct Bian, Z. Lim, C. On functionally graded beams with integrated surface piezoelectric layers. Cady, W.

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Calim, F. Free and forced vibrations of non-uniform composite beams Compos. Chandiramani, N. Librescu , L. Saxena , V. Optimal vibration control of a rotating composite beam with distributed piezoelectric sensing and actuation.

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Active control of a piezo-composite rotating beam using coupled plant Dynamics. Sound Vib. Chandrashekhara, K. Free vibration of composite beams using a refined shear flexible beam element. Chee, C. Tong, L.


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A buildup voltage, BVD algorithm for shape control of smart plate structures. Chen, W. Buehler, M. Parker, G. Optimal sensor design and control of piezoelectric laminate beams. Control Syst. Cheng, Z. Three-dimensional asymptotic approach to inhomogeneous and laminated piezoelectric plates. Solids Struct. Crawley, E. Use of piezoelectric actuators as elements of intelligent structures. Edery-Azulay, L. Active damping of piezo-composite beams. Gawronski, W. Gharib, A. Deflection control of functionally graded material beams with bonded piezoelectric sensors and actuators.

A Hwu, C. Chang, W. Vibration suppression of composite sandwich beams. Inman, D. Vibration with control, measurement and stability. Kang, Y. Park, H. Kim, J. Kapuria, S. Active vibration control of piezoelectric laminated beams with electroded actuators and sensors using an efficient finite element involving an electric node. Kerur, S. A new two-dimensional model for electro-mechanical response of thick laminated piezoelectric actuator. Librescu, L.

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A general linear theory of laminated composite shells featuring interlaminar bonding imperfections. Lin, J. Ljung, L. System Identification Toolbox: for use with Matlab. Maciejowski, J. Multivariable feedback design, Addison Wesley, Great Britain. McKelvey, T. Akcay, H. Subspace-based multivariable system identification from frequency response data.


  1. Optimal Control Theory for the Damping of Vibrations of Simple Elastic Systems - PDF Free Download.
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  5. Optimal Control Theory for the Damping of Vibrations of Simple Elastic Systems | SpringerLink.
  6. Optimal Control Theory for the Damping of Vibrations of Simple Elastic Systems.
  7. Mobile control of vibrations in systems with distributed parameters | SpringerLink?
  8. Manjunath, T. Vibration suppression of timoshenko beams with embedded piezo-electrics using POF. World Academy of Science, Engineering and Technology, Marinova, D. Robust control of composite beams. Automat Rem Contr. Narayan, S. Finite element modeling of piezolaminated smart structures for active vibration control with distributed sensors and actuators J.

    Optimal Control Theory for the Damping of Vibrations of Simple Elastic Systems | SpringerLink

    Overschee, P. Continuous-time frequency domain subspace system identification," Signal Process. Overschee P. N4SID: subspace algorithms for the identification of combined deterministic-stochastic systems. Automatica Peng, X. Lam, K. Active vibration control of composite beams with piezoelectrics: a finite element model with third order theory. Rao, M. Active control of wave propagation in multi-span beams using distributed piezoelectric actuators and sensors. Rao, SR. Dynamic response of non-uniform composite beams.

    Ray, M. Rao, K. Exact analysis of coupled electroelastic behaviour of a piezoelectric plate under cylindrical bending. Saravanos, D. Coupled layerwise analysis of composite beams with embedded piezoelectric sensors and actuators.

    Shih, H. Distributed vibration sensing and control of a piezoelectric laminated curved beam. Smyser, C. Robust vibration control of composite beams using piezoelectric devices and neural networks. Skogestad, S. Multivariable feedback control analysis and design. Optimal Adaptive Control Systems. The computation and theory of optimal control. Optimal Control of Nonlinear Parabolic Systems. Theory of Elastic Waves.

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    Optimal control of nonsmooth distributed parameter systems. Theory of Elastic Stability. Theory of elastic stability. Some Aspects of the optimal Control of distributed parameter systems. Control Theory for Linear Systems. Almost Optimal Adaptive Control Systems. Kubyshkin, V. Nauk, Teor. Utkin, V.

    Pdf Optimal Control Theory For The Damping Of Vibrations Of Simple Elastic Systems 1972

    Komkov, V. Tikhonov, A. Vladimirov, V. Kubyshkin 1 1. Personalised recommendations. Cite article How to cite?


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