On quasistatic inelastic models of gradient type with convex composite constitutive equations
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Publication:1419672
DOI10.2478/BF02475187zbMath1038.35135OpenAlexW2015194506MaRDI QIDQ1419672
Publication date: 19 January 2004
Published in: Central European Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2478/bf02475187
energy methodglobal existencemonotone operatorsYosida approximationinelastic deformationsconvex composite models
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Related Items (8)
QUASISTATIC PROBLEMS IN VISCOPLASTICITY THEORY II: MODELS WITH NONLINEAR HARDENING ⋮ Convergence of coercive approximations for a model of gradient type in poroplasticity ⋮ Renormalized solutions in thermo-visco-plasticity for a Norton-Hoff type model. I: The truncated case. ⋮ The Armstrong-Frederick cyclic hardening plasticity model with Cosserat effects ⋮ Boundary regularity for self-controlling and Cosserat models of viscoplasticity: Interior estimates for models of power type ⋮ Sensitivity upon the constitutive relations in materials with memory ⋮ Nonlinear quasistatic problems of gradient type in inelastic deformations theory ⋮ Mathematical Analysis of Thermoplasticity with Linear Kinematic Hardening
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