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On the theory of thermoelastic materials with a double porosity structure

Simona De Cicco, D. Ieşan

2021Journal of Thermal Stresses19 citationsDOI

Abstract

The linear theory of thermoelastic materials with a double porosity structure is considered. In the first part of the article we establish some basic theorems in the dynamical theory. We derive a reciprocity relation which involves two processes at different instants. This result forms the basis of a uniqueness result and a reciprocal theorem. The uniqueness theorem is established with no definiteness assumption on the elastic constitutive coefficients. Then variational theorems of Gurtin type are presented. The propagation conditions and growth equations which govern the propagation of acceleration waves in homogeneous and isotropic solids are investigated. In the equilibrium theory we study the deformation of a hollow cylinder.

Topics & Concepts

Thermoelastic dampingUniquenessReciprocity (cultural anthropology)IsotropyMathematicsMathematical analysisPositive definitenessUniqueness theorem for Poisson's equationCylinderBasis (linear algebra)PorosityVariational principlePhysicsGeometryMaterials scienceThermodynamicsThermalEigenvalues and eigenvectorsComposite materialPositive-definite matrixPsychologySocial psychologyQuantum mechanicsThermoelastic and Magnetoelastic PhenomenaElasticity and Wave PropagationElasticity and Material Modeling
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