International audienceThis paper presents a high-order node-based smoothed radial point interpolation method (NS-RPIM) with linear strain fields in smoothing domains. The linear smoothed strains are constructed by complete order of polynomial functions and normalized with reference to the central point of the smoothing region. The new NS-RPIM is one order higher than those of the existing methods which use piecewise constant strains. This high-order method still uses linear displacements within each triangular background cell, but linear strains are created over smoothing domains using the pick-out theory. Because the smoothed strain and the compatible strain within a local region are equal in an integral sense, the unknown parameters in th...
Abstract: A smoothed finite element method (SFEM) is presented to analyze linear and geo-metrically ...
The edge-based strain smoothing technique is combined with the three-node Mindlin plate element (MIN...
This paper extends further the strain smoothing technique in finite elements to 8-noded hexahedral e...
It has been proven by the authors that both the upper and lower bounds in energy norm of the exact s...
This paper presents a new scheme of strain-constructed point interpolation method (SC-PIM) for stati...
10.1016/j.enganabound.2009.07.011Engineering Analysis with Boundary Elements342144-157EABA
his paper formulates an edge-based smoothed conforming point interpolation method (ES-CPIM) for soli...
In order to overcome the possible singularity associated with the Point Interpolation Method (PIM), ...
This paper formulates a node-based smoothed conforming point interpolation method (NS-CPIM) for soli...
The cell-based strain smoothing technique is combined with the well-known three-node Mindlin plate e...
The strain smoothing technique over higher order elements and arbitrary polytopes yields less accura...
A parameter optimization of the Radial Point Interpolation Meshless Method (RPIM) is presented in th...
In this article, an enriched radial point interpolation method (e-RPIM) is developed for computation...
The conventional constant strain smoothing technique yields less accurate solutions that other techn...
10.1016/j.finel.2010.05.005Finite Elements in Analysis and Design4610862-874FEAD
Abstract: A smoothed finite element method (SFEM) is presented to analyze linear and geo-metrically ...
The edge-based strain smoothing technique is combined with the three-node Mindlin plate element (MIN...
This paper extends further the strain smoothing technique in finite elements to 8-noded hexahedral e...
It has been proven by the authors that both the upper and lower bounds in energy norm of the exact s...
This paper presents a new scheme of strain-constructed point interpolation method (SC-PIM) for stati...
10.1016/j.enganabound.2009.07.011Engineering Analysis with Boundary Elements342144-157EABA
his paper formulates an edge-based smoothed conforming point interpolation method (ES-CPIM) for soli...
In order to overcome the possible singularity associated with the Point Interpolation Method (PIM), ...
This paper formulates a node-based smoothed conforming point interpolation method (NS-CPIM) for soli...
The cell-based strain smoothing technique is combined with the well-known three-node Mindlin plate e...
The strain smoothing technique over higher order elements and arbitrary polytopes yields less accura...
A parameter optimization of the Radial Point Interpolation Meshless Method (RPIM) is presented in th...
In this article, an enriched radial point interpolation method (e-RPIM) is developed for computation...
The conventional constant strain smoothing technique yields less accurate solutions that other techn...
10.1016/j.finel.2010.05.005Finite Elements in Analysis and Design4610862-874FEAD
Abstract: A smoothed finite element method (SFEM) is presented to analyze linear and geo-metrically ...
The edge-based strain smoothing technique is combined with the three-node Mindlin plate element (MIN...
This paper extends further the strain smoothing technique in finite elements to 8-noded hexahedral e...