Convergence of coercive approximations for a model of gradient type in poroplasticity
From MaRDI portal
Publication:5322057
DOI10.1002/mma.1098zbMath1172.35076OpenAlexW2014095931MaRDI QIDQ5322057
Publication date: 17 July 2009
Published in: Mathematical Methods in the Applied Sciences (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/mma.1098
Fluid-solid interactions (including aero- and hydro-elasticity, porosity, etc.) (74F10) Nonlinear constitutive equations for materials with memory (74D10)
Related Items
Poroplasticity with Cosserat effects ⋮ Dynamical poroplasticity model with mixed boundary conditions -- theory for \(\mathcal{LM}\)-type nonlinearity ⋮ Convergence of a monotonisation procedure for a non-monotone quasi-static model in poroplasticity ⋮ On strong solutions of viscoplasticity without safe-load conditions ⋮ Renormalized solutions in thermo-visco-plasticity for a Norton-Hoff type model. I: The truncated case. ⋮ Prandtl-Reuss dynamical elasto-perfect plasticity without safe-load conditions ⋮ Quasistatic viscoplasticity without safe-load conditions ⋮ Dynamical poroplasticity model -- existence theory for gradient type nonlinearities with Lipschitz perturbations
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Coercive limits for constitutive equations of monotone-gradient type
- Materials with memory. Initial-boundary value problems for constitutive equations with internal variables
- On quasistatic inelastic models of gradient type with convex composite constitutive equations
- A Galerkin Method for Biot Consolidation Model
- Quasistatic Problems in Viscoplasticity Theory I: Models with Linear Hardening
- Convergence of coercive approximations for strictly monotone quasistatic models in inelastic deformation theory
