In this paper, we discuss two alternate techniques to treat hanging nodes in a quadtree mesh. Both the techniques share similarities, in that, they require only boundary information. Moreover, they do not require an explicit form of the shape functions, unlike the conventional approaches, for example, as in the work of Gupta (Int J Numer Methods Eng 12:35, 1978) or Tabarraei and Sukumar (Finite Elem Anal Des 41:686, 2005). Hence, no special numerical integration technique is required. One of the techniques relies on the strain projection procedure, whilst the other is based on the scaled boundary finite element method. Numerical examples are presented to demonstrate the accuracy and the convergence properties of the two techniques
When compared with advanced triangle formulations (e.g. Allman triangle and Arnold MINI), specially ...
The Finite element method (FEM) constitutes a general tool for the numerical solution of partial dif...
This paper extends further the strain smoothing technique in finite elements to 8-noded hexahedral e...
International audienceThis paper describes the use of the eXtended Finite Element Method in the cont...
The quadtree is a hierarchical-type data structure where each parent is recursively divided into fou...
In this paper, the quadtree data structure and conforming polygonal interpolants are used to develop...
A crack propagation modelling technique combining the scaled boundary finite element method and quad...
Certain difficulties with the use of quadrilateral or hexahedral finite elements are related to mesh...
Digital images are increasingly being used as input data for computational analyses. This study pres...
Bibliography: pages 102-107.This thesis deals with further investigations of the enhanced strain fin...
The conventional constant strain smoothing technique yields less accurate solutions that other techn...
When solving partial differential equations by numerical methods, an automatic mesh generation techn...
peer reviewedIn this paper, we propose a smoothed stable extended finite element method (S2XFEM) by ...
peer reviewedSimulations of industrial roll-forming processes using the finite element method typica...
Today finite element method is a well established tool in engineering analysis and design. Though th...
When compared with advanced triangle formulations (e.g. Allman triangle and Arnold MINI), specially ...
The Finite element method (FEM) constitutes a general tool for the numerical solution of partial dif...
This paper extends further the strain smoothing technique in finite elements to 8-noded hexahedral e...
International audienceThis paper describes the use of the eXtended Finite Element Method in the cont...
The quadtree is a hierarchical-type data structure where each parent is recursively divided into fou...
In this paper, the quadtree data structure and conforming polygonal interpolants are used to develop...
A crack propagation modelling technique combining the scaled boundary finite element method and quad...
Certain difficulties with the use of quadrilateral or hexahedral finite elements are related to mesh...
Digital images are increasingly being used as input data for computational analyses. This study pres...
Bibliography: pages 102-107.This thesis deals with further investigations of the enhanced strain fin...
The conventional constant strain smoothing technique yields less accurate solutions that other techn...
When solving partial differential equations by numerical methods, an automatic mesh generation techn...
peer reviewedIn this paper, we propose a smoothed stable extended finite element method (S2XFEM) by ...
peer reviewedSimulations of industrial roll-forming processes using the finite element method typica...
Today finite element method is a well established tool in engineering analysis and design. Though th...
When compared with advanced triangle formulations (e.g. Allman triangle and Arnold MINI), specially ...
The Finite element method (FEM) constitutes a general tool for the numerical solution of partial dif...
This paper extends further the strain smoothing technique in finite elements to 8-noded hexahedral e...