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Analysis for unilateral contact problem with Coulomb’s friction in thermo-electro-visco-elasticity

Mustapha Bouallala, El Hassan Essoufi

2022Filomat10 citationsDOIOpen Access PDF

Abstract

The aim of this paper is to study a Signorini?s problem with Coulomb?s friction between a thermo-electro-viscoelasticity body and an electrically and thermally conductive foundation. The materiel?s behavior is described by the linear thermo-electro-viscoelastic constitutive laws. The variational formulation is written as nonlinear quasivariational inequality for the displacement field, a nonlinear family elliptic variational equations for the electric potential and a nonlinear parabolic variational equations for the temperature field. We prove under some assumption existence of a weak solution to the problem. The thermo-electro-viscoelastic law with a some temperature parameter ? > 0 is considered. Then we prove its unique solution as well as the convergence of its solution to the solution of the original problem as the temperature parameter ? ? 0.

Topics & Concepts

Nonlinear systemMathematicsVariational inequalityViscoelasticityMathematical analysisConstitutive equationUnilateral contactCoulomb's lawElectric potentialCoulombElectric fieldCoulomb frictionMaterials sciencePhysicsVoltageComposite materialThermodynamicsFinite element methodElectronQuantum mechanicsContact Mechanics and Variational InequalitiesMechanical stress and fatigue analysisElasticity and Material Modeling
Analysis for unilateral contact problem with Coulomb’s friction in thermo-electro-visco-elasticity | Litcius