International audienceWe use an asymptotic expansion of the compliance cost functional in linear elasticity to find the optimal material inside elliptic inclusions. We extend the proposed method to material optimization on the whole domain and compare the global quality of the solutions for different inclusion sizes. Specifically, we use an adjusted free material optimization problem, that can be solved globally, as a global lower material optimization bound. Finally, the asymptotic expansion is used as a topological derivative in a simultaneous material and topology optimization problem
Structural Topology Optimization typically features continuum-based descriptions of the investigated...
Abstract. The concept of functionally graded materials (FGMs) is closely related to the concept of t...
The topology optimization method solves the basic engineering problem of distributing a limited amou...
This paper describes some recent developments that treats the simultaneous optimization of material ...
Abstract In topology optimization the goal is to find the ideal material distribution in a domain su...
We present a topology optimization based procedure aiming at the optimal placement (and design) of t...
We derive a representation formula for the topological gradient with respect to arbitrary quadratic ...
Numerical methods of evaluation of topological derivatives are proposed for contact problems in two ...
Functionally Graded Materials (FGMs) possess continuously graded material properties and are charact...
The topological derivative is defined as the first term (correction) of the asymptotic expansion of ...
The problem of topology optimisation is considered for free boundary problems of thin obstacle types...
Topology optimization of a continuum with bimodulus material under multiple load cases (MLC) is inve...
[[abstract]]This paper presents an integrated process of structural topology optimization in minimiz...
Multiscale topological material design, aiming at obtaining optimal distribution of the material at ...
Topology optimization is a practical tool that allows for improved structural designs. This thesis f...
Structural Topology Optimization typically features continuum-based descriptions of the investigated...
Abstract. The concept of functionally graded materials (FGMs) is closely related to the concept of t...
The topology optimization method solves the basic engineering problem of distributing a limited amou...
This paper describes some recent developments that treats the simultaneous optimization of material ...
Abstract In topology optimization the goal is to find the ideal material distribution in a domain su...
We present a topology optimization based procedure aiming at the optimal placement (and design) of t...
We derive a representation formula for the topological gradient with respect to arbitrary quadratic ...
Numerical methods of evaluation of topological derivatives are proposed for contact problems in two ...
Functionally Graded Materials (FGMs) possess continuously graded material properties and are charact...
The topological derivative is defined as the first term (correction) of the asymptotic expansion of ...
The problem of topology optimisation is considered for free boundary problems of thin obstacle types...
Topology optimization of a continuum with bimodulus material under multiple load cases (MLC) is inve...
[[abstract]]This paper presents an integrated process of structural topology optimization in minimiz...
Multiscale topological material design, aiming at obtaining optimal distribution of the material at ...
Topology optimization is a practical tool that allows for improved structural designs. This thesis f...
Structural Topology Optimization typically features continuum-based descriptions of the investigated...
Abstract. The concept of functionally graded materials (FGMs) is closely related to the concept of t...
The topology optimization method solves the basic engineering problem of distributing a limited amou...