2021
DOI: 10.1177/1081286521994258
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On the decay of the energy for radial solutions in Moore–Gibson–Thompson thermoelasticity

Abstract: In this paper, we consider the Moore–Gibson–Thompson thermoelastic theory. We restrict our attention to radially symmetric solutions and we prove the exponential decay with respect to the time variable. We demonstrate this fact with the help of energy arguments. Later, we give some numerical simulations to illustrate this behaviour.

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Cited by 15 publications
(6 citation statements)
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“…Later, some people (see, for instance, Muñoz Rivera 2 and Slemrod 3 ) proved the exponential decay for dimension one, and we cannot expect the exponential stability for a dimension greater than one (see Koch 4 and Lebeau and Zuazua 5 ). For other thermoelastic theories (see previous studies 6–9 ), it has been also proved the exponential decay in one dimension and for radial solutions in the multidimensional setting (see Bazarra et al 10 and Jiang et al 11 ).…”
Section: Introductionmentioning
confidence: 83%
“…Later, some people (see, for instance, Muñoz Rivera 2 and Slemrod 3 ) proved the exponential decay for dimension one, and we cannot expect the exponential stability for a dimension greater than one (see Koch 4 and Lebeau and Zuazua 5 ). For other thermoelastic theories (see previous studies 6–9 ), it has been also proved the exponential decay in one dimension and for radial solutions in the multidimensional setting (see Bazarra et al 10 and Jiang et al 11 ).…”
Section: Introductionmentioning
confidence: 83%
“…Marin et al 32 used the thermoelasticity theory by applying some initial values to investigate the MGT model in a dipolar medium. Bazarra et al 33 studied exponential decay w.r.t. time variable for radially symmetric solutions in the context of MGT theory of thermoelasticity.…”
Section: Introductionmentioning
confidence: 99%
“…On the other hand, in the last decade great interest has been developed to understand the so-called Moore-Gibson-Thompson equation which was first used in fluid mechanics. Recently, this equation has been considered as a heat equation (and then, to analyze the Moore-Gibson-Thompson thermoelasticity) [1][2][3]5,6,13,14,16,22,23,28,31] and a new kind of viscous elastic materials [12,13,27]. In this work, we want to consider a mixture of a viscous solid of Moore-Gibson-Thompson type and an elastic material.…”
Section: Introductionmentioning
confidence: 99%