STRESS-TEMPERATURE EQUATIONS OF MOTION OF IGNACZAK TYPE FOR A THREE-DIMENSIONAL PROBLEM OF MICROPOLAR THERMOELASTICITY
Titel:
STRESS-TEMPERATURE EQUATIONS OF MOTION OF IGNACZAK TYPE FOR A THREE-DIMENSIONAL PROBLEM OF MICROPOLAR THERMOELASTICITY
Auteur:
Al-Hasan, Mountajab Dyszlewicz, Janusz
Verschenen in:
Journal of thermal stresses
Paginering:
Jaargang 24 (2001) nr. 7 pagina's 709-722
Jaar:
2001-07-01
Inhoud:
A stress-temperature initial boundary value problem (STIBVP) of Ignaczak type for the coupled dynamic three-dimensional micropolar thermoelasticity proposed by Eringen?Nowacki is discussed. First, a completeness of the problem is proved. Then, a closed-form singular solution, representing the displacement, rotation, stress, and temperature under the action of harmonic concentrated mass forces and moments, and heat source, for an infinite solid is obtained. Finally, conclusions resulting from the stress-temperature formulation are listed.
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