The current work deals with periodic thermomechanical composite media, in which the material constituents are considered to obey the generalized standard materials laws. The aim is to provide a proper homogenization framework that takes into account both the equilibrium and the thermodynamics laws in microscale and macroscale levels. The study is based on the asymptotic expansion homogenization technique, which permits to deduce useful results about the general structure of microscale and macroscale energy potentials and constitutive laws. The paper also proposes an incremental, linearized formulation that allows to identify suitable thermomechanical tangent moduli for the macroscale problem. The capabilities of this framework are illustrat...
International audienceThe current paper presents a two scale Finite Element approach (FE2), adopting...
In this paper we present an internal variable-based homogenization of a composite made of wavy elast...
This study proposes a multi-field asymptotic homogenization for the analysis of thermo-piezoelectric...
The current work deals with periodic thermomechanical composite media, in which the material constit...
The current work deals with periodic composite media undergoing fully coupled thermomechanical loadi...
The modern technological challenges on the engineering industry and the extensive advances in the ma...
In this paper an asymptotic homogenization method for the analysis of composite materials with perio...
Many engineering and scientific problems require a full understanding of physical phenomena that spa...
The prediction of failure processes in composite, heterogeneous materials require multiscale analysi...
In this paper, a review of papers on mathematical homogenization of dissipative composites under sma...
The combination of thermal and mechanical loading expected in practice means that constitutive equat...
Advancement in manufacturing methods enable designing so called metamaterials with a tailor-made mic...
The current paper presents a two scale Finite Element approach (FE 2 ), adopting the periodic homoge...
A fundamental understanding of the interaction between microstructure and underlying physical mechan...
Classical homogenization methods fail to reproduce the overall response of composite structures when...
International audienceThe current paper presents a two scale Finite Element approach (FE2), adopting...
In this paper we present an internal variable-based homogenization of a composite made of wavy elast...
This study proposes a multi-field asymptotic homogenization for the analysis of thermo-piezoelectric...
The current work deals with periodic thermomechanical composite media, in which the material constit...
The current work deals with periodic composite media undergoing fully coupled thermomechanical loadi...
The modern technological challenges on the engineering industry and the extensive advances in the ma...
In this paper an asymptotic homogenization method for the analysis of composite materials with perio...
Many engineering and scientific problems require a full understanding of physical phenomena that spa...
The prediction of failure processes in composite, heterogeneous materials require multiscale analysi...
In this paper, a review of papers on mathematical homogenization of dissipative composites under sma...
The combination of thermal and mechanical loading expected in practice means that constitutive equat...
Advancement in manufacturing methods enable designing so called metamaterials with a tailor-made mic...
The current paper presents a two scale Finite Element approach (FE 2 ), adopting the periodic homoge...
A fundamental understanding of the interaction between microstructure and underlying physical mechan...
Classical homogenization methods fail to reproduce the overall response of composite structures when...
International audienceThe current paper presents a two scale Finite Element approach (FE2), adopting...
In this paper we present an internal variable-based homogenization of a composite made of wavy elast...
This study proposes a multi-field asymptotic homogenization for the analysis of thermo-piezoelectric...