Add to ORKGA newly developed method, named the quasi-dual function method (QDFM) is pro-posed for extracting edge stress intensity functions (ESIFs) along circular crack fronts from finite element solutions, in a general three-dimensional domain and boundary conditions. The mathematical machinery developed in the framework of the Laplace operator in [17] is extended here to the elasticity system and applied for the extraction of ESIFs from high-order finite element solutions. The QDFM has several important advantages: a) It allows to extract the ESIFs away from the singular edge, thus avoiding the need for a refined FE mesh, b) The ESIFs are obtained as a function along the edge and not as pointwise values, c) The method is general in the sense that i...
Fracture mechanics studies the propagation of cracks in materials. In the framework of linear elasti...
Three-dimensional (3D) finite element analyses (FEA) of clamped single-edge notched tension (SENT) s...
A novel domain integral approach is introduced for the accurate computation of pointwise J-integral ...
Abstract. The solution to elastic isotropic problems in three-dimensional (3-D) polyhedral domains i...
International audienceThe solution to elastic isotropic problems in three-dimensional (3-D) polyhedr...
The stress field in a finite, edge cracked specimen under load is computed using algorithms based on...
This paper presents an efficient numerical weight function technique, based on the boundary element ...
International audienceThe 2D stress intensity factor at the tip of a crack plays an essential role i...
International audienceAsymptotics of solutions to the Laplace equation with Neumann or Dirichlet con...
This research thesis reports the development of a novel concept for Linear Elastic Fracture Mechanic...
Generalized Finite Element Method (GFEM) is a Partition of Unity Method where shape functions are c...
AbstractIn this paper, a numerical procedure, incorporated with the finite element method, is develo...
This work develops accurate weight functions for a single crack at a hole in a finite width plate fo...
A new method to evaluate the stress intensity factors for plates of arbitary shape by conventional f...
We extend the two-level finite element method (2LFEM) to the accurate analysis of axisymmetric crack...
Fracture mechanics studies the propagation of cracks in materials. In the framework of linear elasti...
Three-dimensional (3D) finite element analyses (FEA) of clamped single-edge notched tension (SENT) s...
A novel domain integral approach is introduced for the accurate computation of pointwise J-integral ...
Abstract. The solution to elastic isotropic problems in three-dimensional (3-D) polyhedral domains i...
International audienceThe solution to elastic isotropic problems in three-dimensional (3-D) polyhedr...
The stress field in a finite, edge cracked specimen under load is computed using algorithms based on...
This paper presents an efficient numerical weight function technique, based on the boundary element ...
International audienceThe 2D stress intensity factor at the tip of a crack plays an essential role i...
International audienceAsymptotics of solutions to the Laplace equation with Neumann or Dirichlet con...
This research thesis reports the development of a novel concept for Linear Elastic Fracture Mechanic...
Generalized Finite Element Method (GFEM) is a Partition of Unity Method where shape functions are c...
AbstractIn this paper, a numerical procedure, incorporated with the finite element method, is develo...
This work develops accurate weight functions for a single crack at a hole in a finite width plate fo...
A new method to evaluate the stress intensity factors for plates of arbitary shape by conventional f...
We extend the two-level finite element method (2LFEM) to the accurate analysis of axisymmetric crack...
Fracture mechanics studies the propagation of cracks in materials. In the framework of linear elasti...
Three-dimensional (3D) finite element analyses (FEA) of clamped single-edge notched tension (SENT) s...
A novel domain integral approach is introduced for the accurate computation of pointwise J-integral ...