Spectral analysis of thermoelastic systems under nonclassical thermal models |
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Authors: | Moncef Aouadi Taoufik Moulahi |
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Affiliation: | 1. Ecole Nationale d’Ingénieurs de Bizerte, Département de Mathématiques Appliquées, Université de Carthage, Menzel Abderrahman, Tunisia;2. Faculté des Sciences de Bizerte, Département de Mathématiques, Université de Carthage, Jarzouna, Tunisia |
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Abstract: | We study some spectral properties of the solutions to generalized thermoelastic systems under Lord–Shulman, Green–Lindsay, and Green–Naghdi of type-II models. First, we prove that the linear operator of each model has compact resolvent and generates a C0?semigroup in an appropriate Hilbert space. We also show that there is a sequence of generalized eigenfunctions of the linear operator that forms a Riesz basis. By a detailed spectral analysis, we obtain the expressions of the spectrum and we deduce that the spectrum-determined growth condition holds. Therefore, if the imaginary axis is not an asymptote of the spectrum, we prove that the energy of each model decays exponentially to a rate determined explicitly by the physical parameters. Finally, some simulations are given for each model to support our results. |
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Keywords: | Damping exponential stability generalized thermoelasticity Riesz basis |
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