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On mixed problem in thermoelasticity of type III for Cosserat media

Marín Marín, Aly R. Seadawy, Sorin Vlase, Adina Chirilă

2022Journal of Taibah University for Science115 citationsDOIOpen Access PDF

Abstract

In our present study, we approach a linear theory for the thermoelasticity of type III for Cosserat media. At the beginning we introduce the equations and conditions, specific for a mixed problem in this context, namely the motion and energy equations, the initial condition and boundary relations. After that, we establish two results regarding the solution unique to the problem and two results on the continuous dependence of solutions, for the same mixed problem. Both problems that we address in our paper (uniqueness and continuous dependence) are not based on the material symmetries of the medium. Moreover, our results concern the theory of type III thermoelasticity for Cosserat media in their most general form, namely anisotropic.

Topics & Concepts

UniquenessMathematicsHomogeneous spaceType (biology)Context (archaeology)Boundary value problemMathematical analysisAnisotropyPhysicsGeometryQuantum mechanicsPaleontologyBiologyEcologyThermoelastic and Magnetoelastic PhenomenaNonlocal and gradient elasticity in micro/nano structuresElasticity and Material Modeling
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