Formulation of the scale transition equations coupling the microscopic and macroscopic variables in the second-order computational homogenization of heterogeneous materials and the enforcement of generalized boundary conditions for the representative volume element (RVE) are considered. The proposed formulation builds on current approaches by allowing any type of RVE boundary conditions (e.g. displacement, traction, periodic) and arbitrary shapes of RVE to be applied in a unified manner. The formulation offers a useful geometric interpretation for the assumptions associated with the microstructural displacement fluctuation field within the RVE, which is here extended to second-order computational homogenization. A unified approach to the en...
A procedure for second-order computational homogenization of heterogeneous materials is derived from...
The computational homogenization method enables to derive the overall behavior of heterogeneous mate...
An accurate homogenization method that accounts for large deformations and viscoelastic material beh...
Formulation of the scale transition equations coupling the microscopic and macroscopic variables in ...
Two examples illustrating microstructural size effect and higher-order deformation are considered wi...
This paper presents the detailed implementation and computational aspects of a novel second-order co...
Computational homogenization with a priori assumed scale separation is considered, whereby the macro...
In this paper the intrinsic role of the size of the microstructural representative volume element (R...
A second-order two-scale computational homogenization procedure for modelling deformation responses ...
A gradient-enhanced computational homogenization procedure, that allows for the modelling of microst...
In this paper, a multi-scale technique is proposed for the modeling of microstructured materials up ...
n this work the mechanical boundary condition for the micro problem in a two-scaled homogenization u...
A procedure for second-order computational homogenization of heterogeneous materials is derived from...
The computational homogenization method enables to derive the overall behavior of heterogeneous mate...
An accurate homogenization method that accounts for large deformations and viscoelastic material beh...
Formulation of the scale transition equations coupling the microscopic and macroscopic variables in ...
Two examples illustrating microstructural size effect and higher-order deformation are considered wi...
This paper presents the detailed implementation and computational aspects of a novel second-order co...
Computational homogenization with a priori assumed scale separation is considered, whereby the macro...
In this paper the intrinsic role of the size of the microstructural representative volume element (R...
A second-order two-scale computational homogenization procedure for modelling deformation responses ...
A gradient-enhanced computational homogenization procedure, that allows for the modelling of microst...
In this paper, a multi-scale technique is proposed for the modeling of microstructured materials up ...
n this work the mechanical boundary condition for the micro problem in a two-scaled homogenization u...
A procedure for second-order computational homogenization of heterogeneous materials is derived from...
The computational homogenization method enables to derive the overall behavior of heterogeneous mate...
An accurate homogenization method that accounts for large deformations and viscoelastic material beh...