Haidar Badawi scite author profile

In this paper, we investigate the stabilization of a locally coupled wave equations with local viscoelastic damping of past history type acting only in one equation via non smooth coefficients. First, using a general criteria of Arendt-Batty, we prove the strong stability of our system. Second, using a frequency domain approach combined with the multiplier method, we establish the exponential stability of the solution if and only if the two waves have the same speed of propagation. In case of different speed propagation, we prove that the energy of our system decays polynomially with rate t −1 . Finally, we show the lack of exponential stability if the speeds of wave propagation are different.

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Stability results of locally coupled wave equations with local Kelvin-Voigt damping: Cases when the supports of damping and coupling coefficients are disjoint

Akil¹,

Badawi²,

Nicaise³

2022

Comp. Appl. Math.

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Stability results of a singular local interaction elastic/viscoelastic coupled wave equations with time delay

Akil¹,

Badawi²,

Wehbe³

2021

CPAA

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The purpose of this paper is to investigate the stabilization of a locally coupled wave equations with non smooth localized viscoelastic damping of Kelvin-Voigt type and localized time delay. Using a general criteria of Arendt-Batty, we show the strong stability of our system in the absence of the compactness of the resolvent. Finally, using frequency domain approach combined with the multiplier method, we prove a polynomial energy decay rate of order t −1 .

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On the stability of Bresse system with one discontinuous local internal Kelvin–Voigt damping on the axial force

Akil

Badawi

Nicaise

et al. 2021

Z. Angew. Math. Phys.

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Stability results of a singular local interaction elastic/viscoelastic coupled wave equations with time delay

Akil¹,

Badawi²,

Wehbe³

2020

Preprint

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The purpose of this paper is to investigate the stabilization of a one-dimensional coupled wave equations with non smooth localized viscoelastic damping of Kelvin-Voigt type and localized time delay. Using a general criteria of Arendt-Batty, we show the strong stability of our system in the absence of the compactness of the resolvent. Finally, using frequency domain approach combining with a multiplier method, we prove a polynomial energy decay rate of order t −1 .

show abstract

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Haidar Badawi

Stability results of coupled wave models with locally memory in a past history framework via nonsmooth coefficients on the interface

Stability results of locally coupled wave equations with local Kelvin-Voigt damping: Cases when the supports of damping and coupling coefficients are disjoint

Stability results of a singular local interaction elastic/viscoelastic coupled wave equations with time delay

On the stability of Bresse system with one discontinuous local internal Kelvin–Voigt damping on the axial force

Stability results of a singular local interaction elastic/viscoelastic coupled wave equations with time delay

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