Boundary exact controllability for a porous elastic Timoshenko system
Applications of Mathematics, 2020In this paper, the authors consider the boundary exact controllability of a one-dimensional Timoshenko-type beam fixed at right end and at left end two controls act on the transverse displacement and the rotation angle, respectively. By using the HUM method, the authors prove that the system is boundary exactly controllable in the usual energy space ...
Santos, Manoel J. +2 more
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Stability Results for a Timoshenko System with a Fractional Operator in the Memory
Applied Mathematics & Optimization, 2019zbMATH Open Web Interface contents unavailable due to conflicting licenses.
María Astudillo +1 more
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Stability Result for a New Viscoelastic–Thermoelastic Timoshenko System
Bulletin of the Malaysian Mathematical Sciences Society, 2020zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Cyril Dennis Enyi, Baowei Feng
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Discrete energy behavior of Timoshenko system with Cattaneo’s law
Computational and Applied MathematicszbMATH Open Web Interface contents unavailable due to conflicting licenses.
Ali Smouk, Atika Radid
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Energy decay to Timoshenko's system with thermoelasticity of type III
Asymptotic Analysis, 2014We consider the thermoelastic beam system when the oscillations are defined by the Timoshenko's model and the heat conduction is given by Green and Naghdi theories. Our main result is that the corresponding semigroup is exponentially stable if and only if the wave speeds associated to the hyperbolic part of the system are equal.
Luci Harue Fatori +2 more
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Shearing Viscoelasticity in Partially Dissipative Timoshenko–Boltzmann Systems
SIAM Journal on Mathematical AnalysiszbMATH Open Web Interface contents unavailable due to conflicting licenses.
Eduardo H. Gomes Tavares +3 more
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Stability of a Timoshenko system with local Kelvin–Voigt damping
Zeitschrift für angewandte Mathematik und Physik, 2017In this article, a Timoshenko system with local distributed Kelvin-Voigt damping is considered. More precisely, the authors consider the hyperbolic system \[ \begin{aligned} &\rho_1 w_{tt}-[\kappa(w_x+\phi)+D_1(w_{xt}+\phi_t)]_x=0,\\ &\rho_2\phi_{tt}-(\mu\phi_x+D_2\phi_{xt})_x+\kappa(w_x+\phi)+D_1(w_{xt}+\phi_t)=0, \end{aligned} \] for \((x,t)\in (0,L)\
Xinhong Tian, Qiong Zhang
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Boundary Feedback Stabilization of Kirchhoff-Type Timoshenko System
Journal of Dynamical and Control Systems, 2014zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Wu, Yuhu, Xue, Xiaoping
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Non-exponential stability to a Timoshenko system with heat conduction and Kelvin–Voigt damping
Applied Mathematics Letters, 2023Shugen Chai
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General decay for a viscoelastic-type Timoshenko system with thermoelasticity of type III
Applicable Analysis, 2023Djellali Fayssal
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