A new adaptive multiscale method for the non-linear fracture simulation of heterogeneous materials is proposed. The two major sources of errors in the finite element simulation are discretization and modelling errors. In the failure problems, the discretization error increases due to the strain localization which is also a source for the error in the homogenization of the underlying microstructure. In this paper, the discretization error is controlled by an adaptive mesh refinement procedure following the Zienkiewicz–Zhu technique, and the modelling error, which is the resultant of homogenization of microstructure, is controlled by replacing the macroscopic model with the underlying heterogeneous microstructure. The scale adaptation criteri...
This contribution presents a novel and efficient computational method for simulating the fracture of...
We present an extension of the computational homogenization theory to cases where different structur...
The paper proposes some new computational strategies for affordably solving multiscale fracture prob...
A new adaptive multiscale method for the non-linear fracture simulation of heterogeneous materials i...
peer reviewedAdaptive methods for multiscale fracture In this work, we discuss two classes of meth...
In this paper an adaptive multiscale method is presented in an attempt to address the lack of separa...
A lack of separation of scales is the major hurdle hampering predictive and computationally tractabl...
A lack of separation of scales is the major hurdle hampering predictive and computationally tractab...
Key Words: multiscale finite element; nonlinear fracture mechanics; adaptive modelling In this paper...
In order to simulate fracture in composite structures, one of the most promising approaches is to mo...
This work presents a general formulation of small and large strain multiscale solid constitutive mod...
The multiscale modelling of the heterogeneous materials is a challenge in computational mechanics. I...
AbstractA new approach to two-scale modeling of propagating fracture, based on computational homogen...
A new approach to two-scale modeling of propagating fracture, based on computational homogenization ...
The paper deals with numerical computation of a crack problem posed on microstructural heterogeneous...
This contribution presents a novel and efficient computational method for simulating the fracture of...
We present an extension of the computational homogenization theory to cases where different structur...
The paper proposes some new computational strategies for affordably solving multiscale fracture prob...
A new adaptive multiscale method for the non-linear fracture simulation of heterogeneous materials i...
peer reviewedAdaptive methods for multiscale fracture In this work, we discuss two classes of meth...
In this paper an adaptive multiscale method is presented in an attempt to address the lack of separa...
A lack of separation of scales is the major hurdle hampering predictive and computationally tractabl...
A lack of separation of scales is the major hurdle hampering predictive and computationally tractab...
Key Words: multiscale finite element; nonlinear fracture mechanics; adaptive modelling In this paper...
In order to simulate fracture in composite structures, one of the most promising approaches is to mo...
This work presents a general formulation of small and large strain multiscale solid constitutive mod...
The multiscale modelling of the heterogeneous materials is a challenge in computational mechanics. I...
AbstractA new approach to two-scale modeling of propagating fracture, based on computational homogen...
A new approach to two-scale modeling of propagating fracture, based on computational homogenization ...
The paper deals with numerical computation of a crack problem posed on microstructural heterogeneous...
This contribution presents a novel and efficient computational method for simulating the fracture of...
We present an extension of the computational homogenization theory to cases where different structur...
The paper proposes some new computational strategies for affordably solving multiscale fracture prob...