Abstract The three-dimensional Theory of Elasticity equations lead to a complex solution for most problems in engineering. Therefore, the solutions are typically developed for reduced systems, usually symmetrical or two-dimensional. In this context, computational resources allow the reduction of these simplifications. The most recognized methods of algebraic approximation of the differential equations are the Finite Differences Method and the Finite Element Method (FEM). However, they have limitations in mesh generation and/or adaptation. As follows, Meshless Methods appear as an alternative to these options. The present work uses the Radial Point Interpolation Method (RPIM) to evaluate the stress in two-dimensional beams in regions close t...
A Point Interpolation Method (PIM) is presented for stress analysis for two-dimensional solids. In t...
The basic characteristic of the techniques generally known as ”meshless methods” is the attempt to r...
Error estimation and adaptive applications help to control the discretization errors in finite eleme...
Meshfree methods have become strong alternatives to conventional numerical methods used in solid mec...
In this article, an enriched radial point interpolation method (e-RPIM) is developed for computation...
For both linear and nonlinear analysis, finite element method (FEM) software packages, whether comme...
This paper presents a method of interpolation and regularisation of finite element (FE) results base...
It has been proven by the authors that both the upper and lower bounds in energy norm of the exact s...
AbstractThe basic characteristic of the techniques generally known as meshless methods is the attemp...
This study discussed the effects of shape parameters on the radial point interpolation method (RPIM)...
Multidimensional elastostatic problems can be solved by a collocation method using radial basis func...
In this paper a method to improve the stress state on a 2D finite element (FE) Q1 coarse mesh for fr...
This paper presents a method able to upscale finite element (FE) results obtained for coarse meshes ...
A finite element formulation, based on assumed stress functions, is developed for the linear elastic...
A parameter optimization of the Radial Point Interpolation Meshless Method (RPIM) is presented in th...
A Point Interpolation Method (PIM) is presented for stress analysis for two-dimensional solids. In t...
The basic characteristic of the techniques generally known as ”meshless methods” is the attempt to r...
Error estimation and adaptive applications help to control the discretization errors in finite eleme...
Meshfree methods have become strong alternatives to conventional numerical methods used in solid mec...
In this article, an enriched radial point interpolation method (e-RPIM) is developed for computation...
For both linear and nonlinear analysis, finite element method (FEM) software packages, whether comme...
This paper presents a method of interpolation and regularisation of finite element (FE) results base...
It has been proven by the authors that both the upper and lower bounds in energy norm of the exact s...
AbstractThe basic characteristic of the techniques generally known as meshless methods is the attemp...
This study discussed the effects of shape parameters on the radial point interpolation method (RPIM)...
Multidimensional elastostatic problems can be solved by a collocation method using radial basis func...
In this paper a method to improve the stress state on a 2D finite element (FE) Q1 coarse mesh for fr...
This paper presents a method able to upscale finite element (FE) results obtained for coarse meshes ...
A finite element formulation, based on assumed stress functions, is developed for the linear elastic...
A parameter optimization of the Radial Point Interpolation Meshless Method (RPIM) is presented in th...
A Point Interpolation Method (PIM) is presented for stress analysis for two-dimensional solids. In t...
The basic characteristic of the techniques generally known as ”meshless methods” is the attempt to r...
Error estimation and adaptive applications help to control the discretization errors in finite eleme...