Asymptotic stability of the wave equation on compact manifolds and locally distributed viscoelastic dissipation (Q2845467)

scientific article; zbMATH DE number 6203446

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English	Asymptotic stability of the wave equation on compact manifolds and locally distributed viscoelastic dissipation	scientific article; zbMATH DE number 6203446

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instance of

scholarly article

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title

Asymptotic stability of the wave equation on compact manifolds and locally distributed viscoelastic dissipation (English)

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author

Marcelo M. Cavalcanti

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Valéria N. Domingos Cavalcanti

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Flávio A. F. Nascimento

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published in

Proceedings of the American Mathematical Society

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publication date

30 August 2013

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zbMATH Keywords

viscoelastic distributed damping

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Publication

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cites work

Sharp Sufficient Conditions for the Observation, Control, and Stabilization of Waves from the Boundary

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Decay of solutions of the elastic wave equation with a localized dissipation

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Frictional versus Viscoelastic Damping in a Semilinear Wave Equation

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Uniform stabilization of the wave equation on compact surfaces and locally distributed damping

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Asymptotic stability of the wave equation on compact surfaces and locally distributed damping-A sharp result

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Asymptotic stability of the wave equation on compact manifolds and locally distributed damping: A sharp result

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Semiclassical non-concentration near hyperbolic orbits

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Uniform energy decay for a wave equation with partially supported nonlinear boundary dissipation without growth restrictions

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Stabilization and control for the subcritical semilinear wave equation

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Q3150052

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Microlocal defect measures

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A general decay result for a viscoelastic equation in the presence of past and finite history memories

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Q4879447

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A new method to obtain decay rate estimates for dissipative systems with localized damping

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Escape Function Conditions for the Observation, Control, and Stabilization of the Wave Equation

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Asymptotic behaviour of the energy in partially viscoelastic materials

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Decay and Global Existence for Nonlinear Wave Equations with Localized Dissipations in General Exterior Domains

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Energy decay for the wave equation with boundary and localized dissipations in exterior domains

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Errata

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Asymptotic behavior of a class of abstract semilinear integrodifferential equations and applications

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Optimal decay rates for solutions of a nonlinear wave equation with localized nonlinear dissipation of unrestricted growth and critical exponent source terms under mixed boundary conditions

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Carleman estimates with no lower-order terms for general Riemann wave equations. Global uniqueness and observability in one shot

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Exponential Decay for The Semilinear Wave Equation with Locally Distributed Damping

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review text

The authors show that the solutions to a partial viscoelastic model decay exponentially to zero no matter how small the viscoelastic portion of the material. They also give a new geometric proof of a result due to \textit{J. E. Muñoz Rivera} and \textit{A. Peres Salvatierra} [Q. Appl. Math. 59, No. 3, 557--578 (2001; Zbl 1028.35025)] using microlocal analysis, which allows not only to improve the assumptions imposed on the relaxation function but to extend the result from the Euclidean setting to a compact Riemannian manifold.

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