An automatic adaptive refinement procedure for the reproducing kernel particle method. I: Stress recovery and a posteriori error estimation
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Publication:1015669
DOI10.1007/s00466-006-0140-zzbMath1178.74181OpenAlexW2077409796MaRDI QIDQ1015669
Publication date: 8 May 2009
Published in: Computational Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00466-006-0140-z
reproducing kernel particle methoda posteriori error estimationadaptive refinementstress recovery procedure
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Related Items (5)
Meshfree Methods: A Comprehensive Review of Applications ⋮ An enhanced-strain error estimator for Galerkin meshfree methods based on stabilized conforming nodal integration ⋮ On error estimator and adaptivity in the meshless Galerkin boundary node method ⋮ On the development of adaptive random differential quadrature method with an error recovery technique and its application in the locally high gradient problems ⋮ On Adaptive Refinement Analysis for the Coupled Boundary Element Method—Reproducing Kernel Particle Method
Cites Work
- Unnamed Item
- Unnamed Item
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- Unnamed Item
- An automatic adaptive refinement procedure for the reproducing kernel particle method. II: Adaptive refinement
- An error estimate in the EFG method
- A survey of numerical methods for solving nonlinear integral equations
- A modified collocation method and a penalty formulation for enforcing the essential boundary conditions in the element free Galerkin method
- A unified approach to a posteriori error estimation using element residual methods
- A posteriori error estimation in finite element analysis
- An \(h\)-\(p\) adaptive method using clouds
- An adaptive approach with the element-free-Galerkin method
- A new implementation of the element free Galerkin method
- On coupling of reproducing kernel particle method and boundary element method
- Superconvergence recovery technique anda posteriori error estimators
- The post-processing approach in the finite element method—part 1: Calculation of displacements, stresses and other higher derivatives of the displacements
- The post-processing approach in the finite element method—Part 3:A posteriori error estimates and adaptive mesh selection
- A simple error estimator and adaptive procedure for practical engineerng analysis
- The superconvergent patch recovery anda posteriori error estimates. Part 1: The recovery technique
- Improvement by Iteration for Compact Operator Equations
- A‐posteriori error estimates for the finite element method
- Element‐free Galerkin methods
- A procedure for approximation of the error in the EFG method
- A posteriorierror approximation in EFG method
- Reproducing kernel particle methods for structural dynamics
- Reproducing kernel particle methods
- Superconvergence of the Iterated Galerkin Methods for Hammerstein Equations
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