Inspired by the first order numerical homogenization, we present a method for extracting continuous fluctuation fields from the Wang tile based compression of a material microstructure. The fluctuation fields are then used as enrichment basis in Extended Finite Element Method (XFEM) to reduce number of unknowns in problems with fully resolved microstructural geometry synthesized by means of the tiling concept. In addition, the XFEM basis functions are taken as reduced modes of a detailed discretization in order to circumvent the need for non-standard numerical quadratures. The methodology is illustrated with a scalar steady-state problem
Many engineering materials exhibit heterogeneous microstructures, whose compositions and formations ...
International audienceThe eXtended Finite Element Method (X-FEM) allows one to enrich finite element...
AcceptéInternational audienceIn this contribution, a strategy is proposed for uncoupling geometrical...
Inspired by the first order numerical homogenization, we present a method for extracting continuous ...
In this contribution, we present the concept of Wang Tiles as a surrogate of the periodic unit cell ...
This paper presents a new approach to determining microstructural enrichment func-tions to local fie...
International audienceIn multiscale analysis of components, there is usually a need to solve micro-s...
International audienceIn multiscale analysis of components, there is usually a need to solve micro-s...
Grant Agency of the CTU in Prague, the grant No. SGS19/033/OHK1/1T/11 - Design toolchain for modular...
In this paper we present our recent work focused on the analysis of the abilities of Wang Tiles meth...
International audienceMulti-scale analysis of components usually leads to solving micro-structures w...
This paper aims at a reduction of periodicity artefacts during a generation of random heterogeneous ...
The paper presents a concept/technique to compress and synthesize complex material morphologies that...
International audienceIn this paper, we highlight that, when the eXtended Finite Element Method (XFE...
The present paper investigates the tailoring of bimaterial microstructures minimizing their local st...
Many engineering materials exhibit heterogeneous microstructures, whose compositions and formations ...
International audienceThe eXtended Finite Element Method (X-FEM) allows one to enrich finite element...
AcceptéInternational audienceIn this contribution, a strategy is proposed for uncoupling geometrical...
Inspired by the first order numerical homogenization, we present a method for extracting continuous ...
In this contribution, we present the concept of Wang Tiles as a surrogate of the periodic unit cell ...
This paper presents a new approach to determining microstructural enrichment func-tions to local fie...
International audienceIn multiscale analysis of components, there is usually a need to solve micro-s...
International audienceIn multiscale analysis of components, there is usually a need to solve micro-s...
Grant Agency of the CTU in Prague, the grant No. SGS19/033/OHK1/1T/11 - Design toolchain for modular...
In this paper we present our recent work focused on the analysis of the abilities of Wang Tiles meth...
International audienceMulti-scale analysis of components usually leads to solving micro-structures w...
This paper aims at a reduction of periodicity artefacts during a generation of random heterogeneous ...
The paper presents a concept/technique to compress and synthesize complex material morphologies that...
International audienceIn this paper, we highlight that, when the eXtended Finite Element Method (XFE...
The present paper investigates the tailoring of bimaterial microstructures minimizing their local st...
Many engineering materials exhibit heterogeneous microstructures, whose compositions and formations ...
International audienceThe eXtended Finite Element Method (X-FEM) allows one to enrich finite element...
AcceptéInternational audienceIn this contribution, a strategy is proposed for uncoupling geometrical...