Stable node-based smoothed finite element method for 3D contact problems
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Publication:2115609
DOI10.1007/s00466-021-02114-1OpenAlexW4206533146WikidataQ113326571 ScholiaQ113326571MaRDI QIDQ2115609
Hong Yang, Xiao Sun, She Li, Xiang Yang Cui
Publication date: 17 March 2022
Published in: Computational Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00466-021-02114-1
contact problemsimplicit solverstable node-based smoothed finite element method (SNS-FEM)linear tetrahedral elements
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Cites Work
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- Mortar contact formulations for deformable-deformable contact: past contributions and new extensions for enriched and embedded interface formulations
- On the contact domain method: a comparison of penalty and Lagrange multiplier implementations
- An augmented Lagrangian optimization method for contact analysis problems. II: Numerical evaluation
- Coulomb frictional contact by explicit projection in the cone for finite displacement quasi-static problems
- Segment-based vs. element-based integration for mortar methods in computational contact mechanics
- Proofs of the stability and convergence of a weakened weak method using PIM shape functions
- Temporal stabilization of the node-based smoothed finite element method and solution bound of linear elastostatics and vibration problems
- A segmentation-free isogeometric extended mortar contact method
- A mixed formulation of mortar-based frictionless contact
- A Lagrange multiplier method for the finite element solution of frictionless contact problems
- Smoothed finite element methods (S-FEM): an overview and recent developments
- A large deformation mortar formulation of self contact with finite sliding
- Contact analysis for solids based on linearly conforming radial point interpolation method
- A symmetric boundary element method for contact problems with friction
- Symmetric Galerkin boundary element method for quasi-brittle-fracture and frictional contact problems
- Nodal integration of the element-free Galerkin method
- Formulating dynamic multi-rigid-body contact problems with friction as solvable linear complementarity problems
- A mortar segment-to-segment contact method for large deformation solid mechanics.
- Numerical implementation of two nonconforming finite element methods for unilateral contact
- A stable nodal integration method with strain gradient for static and dynamic analysis of solid mechanics
- An adaptive finite element algorithm for contact problems in plasticity
- A three-dimensional adaptive analysis using the meshfree node-based smoothed point interpolation method (NS-PIM)
- A node-based smoothed finite element method with stabilized discrete shear gap technique for analysis of Reissner-Mindlin plates
- High-order mortar-based contact element using NURBS for the mapping of contact curved surfaces
- Varying-order NURBS discretization: an accurate and efficient method for isogeometric analysis of large deformation contact problems
- A stabilized Lagrange multiplier method for the finite element approximation of contact problems in elastostatics
- A posteriori error analysis for finite element solutions of a frictional contact problem
- A three-dimensional large deformation meshfree method for arbitrary evolving cracks
- A stable node-based smoothed finite element method for metal forming analysis
- A novel alpha finite element method (\(\alpha \)FEM) for exact solution to mechanics problems using triangular and tetrahedral elements
- Analysis of plates and shells using an edge-based smoothed finite element method
- Blossom-Quad: A non-uniform quadrilateral mesh generator using a minimum-cost perfect-matching algorithm
- A novel singular node-based smoothed finite element method (NS-FEM) for upper bound solutions of fracture problems
- A Smoothed Finite Element Method (SFEM) for Linear and Geometrically Nonlinear Analysis of Plates and Shells
- Contact Mechanics
- An augmented lagrangian treatment of contact problems involving friction
- Finite element formulations for large deformation dynamic analysis
- An augmented Lagrangian method for discrete large‐slip contact problems
- A G space theory and a weakened weak (W2 ) form for a unified formulation of compatible and incompatible methods: Part II applications to solid mechanics problems
- Computational Contact Mechanics
- Blossom-Quad
- A robust scheme based on novel‐operational matrices for some classes of time‐fractional nonlinear problems arising in mechanics and mathematical physics
