Article
MSC:
74A20,
74C99,
74D10,
76A02,
76A05,
76A10 | MR 1994378 | Zbl 1099.74009 | DOI: 10.1023/A:1026062615145
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Keywords:
constitutive relations; constraint; Lagrange multiplier; Helmholtz potential; rate of dissipation; elasticity; inelasticity; viscoelasticity
constitutive relations; constraint; Lagrange multiplier; Helmholtz potential; rate of dissipation; elasticity; inelasticity; viscoelasticity
Summary:
In classical constitutive models such as the Navier-Stokes fluid model, and the Hookean or neo-Hookean solid models, the stress is given explicitly in terms of kinematical quantities. Models for viscoelastic and inelastic responses on the other hand are usually implicit relationships between the stress and the kinematical quantities. Another class of problems wherein it would be natural to develop implicit constitutive theories, though seldom resorted to, are models for bodies that are constrained. In general, for such materials the material moduli that characterize the extra stress could depend on the constraint reaction. (E.g., in an incompressible fluid, the viscosity could depend on the constraint reaction associated with the constraint of incompressibility. In the linear case, this would be the pressure.) Here we discuss such implicit constitutive theories. We also discuss a class of bodies described by an implicit constitutive relation for the specific Helmholtz potential that depends on both the stress and strain, and which does not dissipate in any admissible process. The stress in such a material is not derivable from a potential, i.e., the body is not hyperelastic (Green elastic).
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