Dynamical poroplasticity model -- existence theory for gradient type nonlinearities with Lipschitz perturbations
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Publication:511268
DOI10.1016/j.jmaa.2017.01.045zbMath1360.35272OpenAlexW2582906565MaRDI QIDQ511268
Publication date: 14 February 2017
Published in: Journal of Mathematical Analysis and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jmaa.2017.01.045
Flows in porous media; filtration; seepage (76S05) Soil and rock mechanics (74L10) Linear constitutive equations for materials with memory (74D05) PDEs in connection with mechanics of deformable solids (35Q74)
Related Items (2)
On strong solutions of viscoplasticity without safe-load conditions ⋮ Prandtl-Reuss dynamical elasto-perfect plasticity without safe-load conditions
Cites Work
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- Dynamical poroplasticity model with mixed boundary conditions -- theory for \(\mathcal{LM}\)-type nonlinearity
- A first regularity result for the Armstrong-Frederick cyclic hardening plasticity model with Cosserat effects
- Existence of a solution to a non-monotone dynamic model in poroplasticity with mixed boundary conditions
- Solutions to the quasistatic problem from the theory of inelastic deformations with linear growth condition
- Convergence of a monotonisation procedure for a non-monotone quasi-static model in poroplasticity
- Nonlinear quasistatic problems of gradient type in inelastic deformations theory
- Functions of bounded deformation
- Existence theorems for plasticity problems
- Coercive limits for constitutive equations of monotone-gradient type
- A derivative-coderivative inclusion in second-order nonsmooth analysis
- Materials with memory. Initial-boundary value problems for constitutive equations with internal variables
- Nonhomogeneous initial-boundary value problems for coercive and self-controlling models of monotone type
- Diffusion in poro-elastic media
- A generalized Norton-Hoff model and the Prandtl-Reuss law of plasticity
- Dynamical evolution of elasto-perfectly plastic bodies
- The Armstrong-Frederick cyclic hardening plasticity model with Cosserat effects
- On singular limits to Bodner-Partom model
- Thermo-visco-elasticity for Norton-Hoff-type models with Cosserat effects
- Global existence of weak-type solutions for models of monotone type in the theory of inelastic deformations
- Convergence of coercive approximations for strictly monotone quasistatic models in inelastic deformation theory
- Convergence of coercive approximations for a model of gradient type in poroplasticity
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