Constitutive equations for thermomechanical materials with memory
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Publication:2544762
DOI10.1016/0020-7225(70)90023-6zbMath0212.58303OpenAlexW2063222047MaRDI QIDQ2544762
Publication date: 1970
Published in: International Journal of Engineering Science (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0020-7225(70)90023-6
Thermodynamics in solid mechanics (74A15) Theory of constitutive functions in solid mechanics (74A20)
Related Items (18)
STABILITY OF ABSTRACT LINEAR THERMOELASTIC SYSTEMS WITH MEMORY ⋮ Maximum recoverable work and pseudofree energies for a rigid heat conductor ⋮ Saint-Venant's principle for rigid heat conductors with memory ⋮ Unnamed Item ⋮ Heat conduction with memory: a singular kernel problem ⋮ An evolution problem in materials with fading memory: solution's existence and uniqueness ⋮ Domain of influence and uniqueness in viscothermoelasticity of integral type ⋮ On rigid linear heat conductors with memory ⋮ Consequences of non-uniqueness in the free energy of materials with memory ⋮ Equivalent histories, states and a variational problem for a rigid linear heat conductor with memory ⋮ Maximum recoverable work for a rigid heat conductor with memory ⋮ Heat waves ⋮ Singular kernel problems in materials with memory ⋮ A Proposal Concerning the Physical Rate of Dissipation of Materials with Memory: The Non-isothermal Case ⋮ Singular surfaces in linear homogeneous isotropic thermo-viscoelastic materials of integral type ⋮ Existence, uniqueness and exponential decay: An evolution problem in heat conduction with memory ⋮ Asymptotic behavior in linear thermoelasticity ⋮ Some remarks on the model of rigid heat conductor with memory: unbounded heat relaxation function
Cites Work
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- On thermodynamics, strain impulses, and viscoelasticity
- Waves in materials with memory. I: The velocity of one-dimensional shock and acceleration waves
- A unified theory of thermomechanical materials
- A general theory of heat conduction with finite wave speeds
- Static grounds for inequalities in finite strain of elastic materials
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