AbstractThe standard collocation finite element method requires a fine mesh in the vicinity of singularities. The concept of enriched elements is introduced to rectify this limitation. The additional degree of freedom is handled by introducing a constraint equation relating the stress intensity factor to the nodal values in the interior. The numerical results indicate that the recommended strategy is viable and leads to a significant improvement in the accuracy
AbstractWe consider mesh-point optimization for certain collocation-projection methods for solving b...
A variant of the extended finite element method is presented which facilitates the use of enriched e...
Enriched finite element methods have gained traction in recent years for modeling problems with mate...
AbstractThe standard collocation finite element method requires a fine mesh in the vicinity of singu...
We demonstrate the potential of collocation methods for efficient higher-order analysis on standard ...
We extend the theory of boundary element collocation methods by allowing reduced inter-element smoot...
Abstract. A discontinuous collocation-finite element method with interior penalties is proposed and ...
This thesis presents advances and applications of the eXtended Finite Element Method (XFEM). The nov...
This thesis presents advances and applications of the eXtended Finite Element Method (XFEM). The no...
AbstractNumerical treatment of the elliptic boundary value problem with nonsmooth solution by the fi...
peer reviewedWe provide a primer to numerical methods based on Taylor series expansions such as gene...
In Finite Element Method (FEM), the stress components are calculated within the elements firstly, an...
Until recently, problems defined in infinite domains were usually solved using truncated finite elem...
An improvement to the classical finite element (FE) method is proposed. It is able to exactly repres...
Boundary collocation for two dimensional stress analysis of cracks emanating from or from near holes...
AbstractWe consider mesh-point optimization for certain collocation-projection methods for solving b...
A variant of the extended finite element method is presented which facilitates the use of enriched e...
Enriched finite element methods have gained traction in recent years for modeling problems with mate...
AbstractThe standard collocation finite element method requires a fine mesh in the vicinity of singu...
We demonstrate the potential of collocation methods for efficient higher-order analysis on standard ...
We extend the theory of boundary element collocation methods by allowing reduced inter-element smoot...
Abstract. A discontinuous collocation-finite element method with interior penalties is proposed and ...
This thesis presents advances and applications of the eXtended Finite Element Method (XFEM). The nov...
This thesis presents advances and applications of the eXtended Finite Element Method (XFEM). The no...
AbstractNumerical treatment of the elliptic boundary value problem with nonsmooth solution by the fi...
peer reviewedWe provide a primer to numerical methods based on Taylor series expansions such as gene...
In Finite Element Method (FEM), the stress components are calculated within the elements firstly, an...
Until recently, problems defined in infinite domains were usually solved using truncated finite elem...
An improvement to the classical finite element (FE) method is proposed. It is able to exactly repres...
Boundary collocation for two dimensional stress analysis of cracks emanating from or from near holes...
AbstractWe consider mesh-point optimization for certain collocation-projection methods for solving b...
A variant of the extended finite element method is presented which facilitates the use of enriched e...
Enriched finite element methods have gained traction in recent years for modeling problems with mate...