Publikation: Decay properties for the Cauchy problem of the linear JMGT-viscoelastic plate with heat conduction
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We consider the Cauchy problem related to the JMGT-viscoelastic plate coupled with a heat equation with two kinds of thermal laws, which are thermoelasticity of type III and the Gurtin-Pipkin thermal law, respectively. We prove optimal results on decay rates for both the thermoelasticity type III system and the Gurtin-Pipkin thermal law system. More precisely, for the type III system, we show that the decay property is not of regularity-loss type in both the subcritical and critical cases. The result matches with the system in a bounded domain, where the system is known to be exponentially stable in the subcritical case. For the Gurtin-Pipkin thermal law system, there is a regularity-loss phenomenon in the critical case. We also study the asymptotic expansion of the eigenvalues to prove the optimality of the obtained decay rates for both models.
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WANG, Danhua, Wenjun LIU, Reinhard RACKE, 2022. Decay properties for the Cauchy problem of the linear JMGT-viscoelastic plate with heat conductionBibTex
@techreport{Wang2022Decay-58876, year={2022}, series={Konstanzer Schriften in Mathematik}, title={Decay properties for the Cauchy problem of the linear JMGT-viscoelastic plate with heat conduction}, number={406}, author={Wang, Danhua and Liu, Wenjun and Racke, Reinhard} }
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