A Posteriori Error Estimates for the Approximations of the Stresses in the Hencky Plasticity Problem
From MaRDI portal
Publication:3016313
DOI10.1080/01630563.2011.571802zbMath1419.74076OpenAlexW1985438417WikidataQ110098859 ScholiaQ110098859MaRDI QIDQ3016313
Fuchs, Martin, Sergey I. Repin
Publication date: 15 July 2011
Published in: Numerical Functional Analysis and Optimization (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/01630563.2011.571802
duality theoryperfect plasticityvariational problems with linear growtha posteriori error estimates of functional type
Small-strain, rate-independent theories of plasticity (including rigid-plastic and elasto-plastic materials) (74C05) Energy minimization in equilibrium problems in solid mechanics (74G65)
Related Items
Computable upper bounds for the constants in Poincaré-type inequalities for fields of bounded deformation ⋮ Discretization and numerical realization of contact problems for elastic-perfectly plastic bodies. PART I - discretization, limit analysis ⋮ An alternative approach towards the higher order denoising of images. analytical aspects ⋮ Verification of functional a posteriori error estimates for obstacle problem in 1D ⋮ Verification of functional a posteriori error estimates for obstacle problem in 2D
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Estimates of deviations from exact solutions of variational inequalities based upon Payne-Weinberger inequality
- An optimal Poincaré inequality for convex domains
- Dual spaces of stresses and strains, with applications to Hencky plasticity
- A posteriori estimates for partial differential equations
- Numerical solution of a variational problem arising in stress analysis: the vector case
- Functional a posteriori error estimates for incremental models in elasto-plasticity
- Existence of the displacements field for an elasto-plastic body subject to Hecky's law and von Mises yield condition
- Résolution numérique du problème des surfaces minima
- A posteriori error estimation for elasto-plastic problems based on duality theory
- Error estimates for stresses in the finite element analysis of the two-dimensional elasto-plastic problems
- Convex variational problems. Linear, nearly linear and anisotropic growth conditions
- Variational methods for problems from plasticity theory and for generalized Newtonian fluids
- The Elastic–Plastic Torsion Problem:A PosterioriError Estimates for Approximate Solutions
- A posteriori error estimates of functional type for variational problems related to generalized Newtonian fluids
- Numerical analysis of nonsmooth variational problems of perfect plasticity
- ERRORS OF FINITE ELEMENT METHOD FOR PERFECTLY ELASTO-PLASTIC PROBLEMS
- A posteriori error estimation for variational problems with uniformly convex functionals
- Numerical Enclosures for Variational Inequalities
