The cohesive segments method is a finite element framework that allows for the simulation of the nucleation, growth and coalescence of multiple cracks in solids. In this framework, cracks are introduced as jumps in the displacement field by employing the partition of unity property of finite element shape functions. The magnitude of these jumps are governed by cohesive constitutive relations. In this paper, the cohesive segments method is extended for the simulation of fast crack propagation in brittle solids. The performance of the method is demonstrated in several examples involving crack growth in linear elastic solids under plane stress conditions: tensile loading of a block; shear loading of a block and crack growth along and near a bi...
ABSTRACT. This contribution presents a novel approach of the cohesive finite element method based on...
Predicting the remaining fatigue life of a structure with crack(s) is generally conducted by the fra...
We develop a three-dimensional finite-deformation cohesive element and a class of irreversible cohes...
The cohesive segments method is a finite element framework that allows for the simulation of the nuc...
In the cohesive segments method, a crack is represented by a set of overlapping cohesive segments wh...
A numerical method for crack growth is described in which the crack is not regarded as a single disc...
A numerical method for crack growth is described in which the crack is not regarded as a single disc...
Summary. In the cohesive segments method, the nucleation, growth and coalescence of cracks is modell...
The backbone of a numerical technique for the simulation of self-healing mechanisms is the cohesive ...
The importance of the cohesive-zone approach to analyse localisation and fracture in engineering mat...
A computational method for arbitrary crack motion through a finite element mesh, termed as the gener...
The present contribution is concerned with the computational modelling of cohesive cracks in quasibr...
We investigate the propagation of cracks in 2-d elastic domains, which are subjected to quasi-static...
ABSTRACT. This contribution presents a novel approach of the cohesive finite element method based on...
Predicting the remaining fatigue life of a structure with crack(s) is generally conducted by the fra...
We develop a three-dimensional finite-deformation cohesive element and a class of irreversible cohes...
The cohesive segments method is a finite element framework that allows for the simulation of the nuc...
In the cohesive segments method, a crack is represented by a set of overlapping cohesive segments wh...
A numerical method for crack growth is described in which the crack is not regarded as a single disc...
A numerical method for crack growth is described in which the crack is not regarded as a single disc...
Summary. In the cohesive segments method, the nucleation, growth and coalescence of cracks is modell...
The backbone of a numerical technique for the simulation of self-healing mechanisms is the cohesive ...
The importance of the cohesive-zone approach to analyse localisation and fracture in engineering mat...
A computational method for arbitrary crack motion through a finite element mesh, termed as the gener...
The present contribution is concerned with the computational modelling of cohesive cracks in quasibr...
We investigate the propagation of cracks in 2-d elastic domains, which are subjected to quasi-static...
ABSTRACT. This contribution presents a novel approach of the cohesive finite element method based on...
Predicting the remaining fatigue life of a structure with crack(s) is generally conducted by the fra...
We develop a three-dimensional finite-deformation cohesive element and a class of irreversible cohes...