A stable formulation of correspondence-based peridynamics with a computational structure of a method using nodal integration
From MaRDI portal
Publication:6592323
DOI10.1002/nme.7465MaRDI QIDQ6592323
Masoud Behzadinasab, Jiarui Wang, Weican Li, Yuri Bazilevs
Publication date: 26 August 2024
Published in: International Journal for Numerical Methods in Engineering (Search for Journal in Brave)
Cites Work
- Finite element stabilization matrices - A unification approach
- Consistent tangent operators for rate-independent elastoplasticity
- A discussion of stress rates in finite deformation problems
- Isogeometric analysis: CAD, finite elements, NURBS, exact geometry and mesh refinement
- A Lagrangian reproducing kernel particle method for metal forming analysis
- Nodal integration of the element-free Galerkin method
- Reproducing kernel particle methods for large deformation analysis of nonlinear structures
- An accurate numerical algorithm for stress integration with finite rotations
- Reformulation of elasticity theory for discontinuities and long-range forces
- Superconvergent gradient smoothing meshfree collocation method
- A modified peridynamics correspondence principle: removal of zero-energy deformation and other implications
- Reduced quadrature for FEM, IGA and meshfree methods
- An accuracy analysis of Galerkin meshfree methods accounting for numerical integration
- Mixed peridynamic formulations for compressible and incompressible finite deformations
- A semi-Lagrangian constitutive correspondence framework for peridynamics
- Stability of peridynamic correspondence material models and their particle discretizations
- Peridynamic states and constitutive modeling
- An approach for incorporating classical continuum damage models in state-based peridynamics
- A meshfree unification: reproducing kernel peridynamics
- \(\overline {\text B}\) and \(\overline {\text F}\) projection methods for nearly incompressible linear and nonlinear elasticity and plasticity using higher-order NURBS elements
- Arbitrary order recursive formulation of meshfree gradients with application to superconvergent collocation analysis of Kirchhoff plates
- Reduced quadrature for finite element and isogeometric methods in nonlinear solids
- A stabilized conforming nodal integration for Galerkin mesh-free methods
- Isogeometric analysis of nearly incompressible solids
- A gradient reproducing kernel collocation method for boundary value problems
- An arbitrary order variationally consistent integration for Galerkin meshfree methods
- An accelerated, convergent, and stable nodal integration in Galerkin meshfree methods for linear and nonlinear mechanics
- Generalization of selective integration procedures to anisotropic and nonlinear media
- Element‐free Galerkin methods
- Reproducing kernel particle methods
- Error analysis of the reproducing kernel particle method
- An improved formulation for reduced quadrature in computational solid mechanics
- Upwind reproducing kernel collocation method for convection-dominated problems
Related Items (1)
This page was built for publication: A stable formulation of correspondence-based peridynamics with a computational structure of a method using nodal integration
Report a bug (only for logged in users!)Click here to report a bug for this page (MaRDI item Q6592323)
