It has been proven by the authors that both the upper and lower bounds in energy norm of the exact solution to elasticity problems can now be obtained by using the fully compatible finite element method (FEM) and linearly conforming point interpola-tion method (LC-PIM). This paper examines the upper bound property of the linearly conforming radial point interpolation method (LC-RPIM), where the Radial Basis Func-tions (RBFs) are used to construct shape functions and node-based smoothed strains are used to formulate the discrete system equations. It is found that the LC-RPIM also provides the upper bound of the exact solution in energy norm to elasticity problems, and it is much sharper than that of LC-PIM due to the decrease of stiffening e...
Error estimation and adaptive applications help to control the discretization errors in finite eleme...
For both linear and nonlinear analysis, finite element method (FEM) software packages, whether comme...
We consider a class of two-dimensional problems in classical linear elasticity for which material ov...
In this article, an enriched radial point interpolation method (e-RPIM) is developed for computation...
10.1002/nme.2204International Journal for Numerical Methods in Engineering7471128-1161IJNM
Meshfree methods have become strong alternatives to conventional numerical methods used in solid mec...
A linearly conforming point interpolation method (LC-PIM) is developed for 2D solid problems. In thi...
The upper bound property for solid mechanics of the linearly conforming radial point interpolation m...
International audienceThis paper presents a high-order node-based smoothed radial point interpolatio...
In order to overcome the possible singularity associated with the Point Interpolation Method (PIM), ...
Abstract The three-dimensional Theory of Elasticity equations lead to a complex solution for most pr...
10.1002/nme.2050International Journal for Numerical Methods in Engineering72131524-1543IJNM
his paper formulates an edge-based smoothed conforming point interpolation method (ES-CPIM) for soli...
This study discussed the effects of shape parameters on the radial point interpolation method (RPIM)...
It is well known that a high-order point interpolation method (PIM) based on the standard Galerkin f...
Error estimation and adaptive applications help to control the discretization errors in finite eleme...
For both linear and nonlinear analysis, finite element method (FEM) software packages, whether comme...
We consider a class of two-dimensional problems in classical linear elasticity for which material ov...
In this article, an enriched radial point interpolation method (e-RPIM) is developed for computation...
10.1002/nme.2204International Journal for Numerical Methods in Engineering7471128-1161IJNM
Meshfree methods have become strong alternatives to conventional numerical methods used in solid mec...
A linearly conforming point interpolation method (LC-PIM) is developed for 2D solid problems. In thi...
The upper bound property for solid mechanics of the linearly conforming radial point interpolation m...
International audienceThis paper presents a high-order node-based smoothed radial point interpolatio...
In order to overcome the possible singularity associated with the Point Interpolation Method (PIM), ...
Abstract The three-dimensional Theory of Elasticity equations lead to a complex solution for most pr...
10.1002/nme.2050International Journal for Numerical Methods in Engineering72131524-1543IJNM
his paper formulates an edge-based smoothed conforming point interpolation method (ES-CPIM) for soli...
This study discussed the effects of shape parameters on the radial point interpolation method (RPIM)...
It is well known that a high-order point interpolation method (PIM) based on the standard Galerkin f...
Error estimation and adaptive applications help to control the discretization errors in finite eleme...
For both linear and nonlinear analysis, finite element method (FEM) software packages, whether comme...
We consider a class of two-dimensional problems in classical linear elasticity for which material ov...