Thermoelastic Processes by a Continuous Heat Source Line in an Infinite Solid via Moore–Gibson–Thompson Thermoelasticity

Many attempts have been made to investigate the classical heat transfer of Fourier, and a number of improvements have been implemented. In this work, we consider a novel thermoelasticity model based on the Moore–Gibson–Thompson equation in cases where some of these models fail to be positive. This t...

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Bibliographic Details
Published in:Materials 2020-10, Vol.13 (19), p.4463
Main Authors: Abouelregal, Ahmed E., Ahmed, Ibrahim-Elkhalil, Nasr, Mohamed E., Khalil, Khalil M., Zakria, Adam, Mohammed, Fawzy A.
Format: Article
Language:English
Subjects:
Heat
Mathematical models
Parabolic differential equations
Partial differential equations
Temperature
Thermal energy
Thermodynamics
Thermoelasticity
Thermomechanical analysis
Variables
Wave propagation
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Summary:Many attempts have been made to investigate the classical heat transfer of Fourier, and a number of improvements have been implemented. In this work, we consider a novel thermoelasticity model based on the Moore–Gibson–Thompson equation in cases where some of these models fail to be positive. This thermomechanical model has been constructed in combination with a hyperbolic partial differential equation for the variation of the displacement field and a parabolic differential equation for the temperature increment. The presented model is applied to investigate the wave propagation in an isotropic and infinite body subjected to a continuous thermal line source. To solve this problem, together with Laplace and Hankel transform methods, the potential function approach has been used. Laplace and Hankel inverse transformations are used to find solutions to different physical fields in the space–time domain. The problem is validated by calculating the numerical calculations of the physical fields for a given material. The numerical and theoretical results of other thermoelastic models have been compared with those described previously.
ISSN:1996-1944
1996-1944
DOI:10.3390/ma13194463