This paper promotes the development of a novel family of finite elements with smoothed strains, offering remarkable properties. In the smoothed finite element method (FEM), elements are divided into subcells. The strain at a point is defined as a weighted average of the standard strain field over a representative domain. This yields superconvergent stresses, both in regular and singular settings, as well as increased accuracy, with slightly lower computational cost than the standard FEM. The one-subcell version that does not exhibit volumetric locking yields more accurate stresses but less accurate displacements and is equivalent to a quasi-equilibrium FEM. It is also subject to instabilities. In the limit where the number of subcells...
This work presents a locking-free smoothed finite element method (S-FEM) for the simulation of soft ...
We revisit the cell-based smoothed finite element method (SFEM) for quadrilateral elements and exten...
peer reviewedThis paper extends further the strain smoothing technique in finite elements to 8-noded...
This paper promotes the development of a novel family of finite elements with smoothed strains, offe...
International audiencepresent a method which we believe can serve as a mid-way solution between comp...
This communication shows how the smoothed finite element method (SFEM) very recently proposed by G. ...
peer reviewedWe present in this paper recent achievements realised on the application of strain smoo...
The finite element method (FEM) has proven to be a widely popular tool in various engineering fields...
peer reviewedWe present a robust and efficient form of the smoothed finite element method (S-FEM) to...
We show both theoretically and numerically a connection between the smoothed finite element method (...
It is well known that the finite element method (FEM) suffers severely from the volumetric locking p...
We show both theoretically and numerically a connection between the smoothed finite element method (...
peer reviewedThis paper shows how the strain smoothing technique recently proposed by G.R.Liu [1] co...
International audienceThe extended finite element method (XFEM) introduced by Belytschko [1] allows ...
The extended finite element method was introduced in 1999 to treat problems involving discontinuitie...
This work presents a locking-free smoothed finite element method (S-FEM) for the simulation of soft ...
We revisit the cell-based smoothed finite element method (SFEM) for quadrilateral elements and exten...
peer reviewedThis paper extends further the strain smoothing technique in finite elements to 8-noded...
This paper promotes the development of a novel family of finite elements with smoothed strains, offe...
International audiencepresent a method which we believe can serve as a mid-way solution between comp...
This communication shows how the smoothed finite element method (SFEM) very recently proposed by G. ...
peer reviewedWe present in this paper recent achievements realised on the application of strain smoo...
The finite element method (FEM) has proven to be a widely popular tool in various engineering fields...
peer reviewedWe present a robust and efficient form of the smoothed finite element method (S-FEM) to...
We show both theoretically and numerically a connection between the smoothed finite element method (...
It is well known that the finite element method (FEM) suffers severely from the volumetric locking p...
We show both theoretically and numerically a connection between the smoothed finite element method (...
peer reviewedThis paper shows how the strain smoothing technique recently proposed by G.R.Liu [1] co...
International audienceThe extended finite element method (XFEM) introduced by Belytschko [1] allows ...
The extended finite element method was introduced in 1999 to treat problems involving discontinuitie...
This work presents a locking-free smoothed finite element method (S-FEM) for the simulation of soft ...
We revisit the cell-based smoothed finite element method (SFEM) for quadrilateral elements and exten...
peer reviewedThis paper extends further the strain smoothing technique in finite elements to 8-noded...