Contact Analysis Within the Bi-Potential Framework Using Cell-Based Smoothed Finite Element Method
From MaRDI portal
Publication:5057670
DOI10.1142/S0219876221410048OpenAlexW3124487576MaRDI QIDQ5057670
Qianwei Chen, Zhi-Qiang Feng, Yan Li, Huijian Chen
Publication date: 19 December 2022
Published in: International Journal of Computational Methods (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s0219876221410048
Related Items
Cites Work
- Unnamed Item
- On the contact domain method: a comparison of penalty and Lagrange multiplier implementations
- Solution of large deformation contact problems with friction between Blatz-Ko hyperelastic bodies
- Solution of large deformation impact problems with friction between Blatz-Ko hyperelastic bodies
- Contact analysis for solids based on linearly conforming radial point interpolation method
- A smoothed finite element method for mechanics problems
- The finite element method with Lagrange multipliers on the boundary: Circumventing the Babuška-Brezzi condition
- A symmetric boundary element method for contact problems with friction
- The bipotential method: a constructive approach to design the complete contact law with friction and improved numerical algorithms.
- Finite element method with Lagrange multipliers for contact problems with friction
- Uzawa algorithm to solve elastic and elastic-plastic fretting wear problems within the bipotential framework
- Hybrid smoothed finite element method for acoustic problems
- A Newton-like algorithm to solve contact and wear problems with pressure-dependent friction coefficients
- Bi-potential and co-rotational formulations applied for real time simulation involving friction and large deformation
- A three-dimensional large deformation meshfree method for arbitrary evolving cracks
- A contact analysis approach based on linear complementarity formulation using smoothed finite element methods
- A solution method for planar and axisymmetric contact problems
- Theoretical aspects of the smoothed finite element method (SFEM)
- Uzawa and Newton algorithms to solve frictional contact problems within the bi-potential framework
- Contact Mechanics
- The Finite Element Method with Lagrange Multipliers for Domains with Corners
- Lagrange constraints for transient finite element surface contact
- Contact‐impact by the pinball algorithm with penalty and Lagrangian methods
- A new boundary element/mathematical programming method for contact problems with friction
- Computational Contact Mechanics
