Abstract. The problem of relaxation of optimal design problems for multiphase composite structures in the presence of constraints on the gradient of the state variable is addressed. A relaxed formulation for the problem is given in the presence of a finite or infinite number of constraints. The relaxed formulation is used to identify minimizing sequences of configurations of phases
We are concerned with the optimal design of composite materials with periodic microstructures. A hom...
AbstractWe consider the relatively simple but non-trivial example of an optimal design problem with ...
The paper considers the problem of optimum distribution of two materials with a linear scalar ellipt...
The problem of the relaxation of optimal design problems for multiphase composite structures in the ...
We introduce a rigorously based numerical method for compliance minimization problems in the presenc...
In most shape optimization problems, the optimal solution does not belong to the set of genuine shap...
International audienceThis paper is concerned with the following optimal design problem:¯nd the dist...
In this work new homogenization results are used to introduce a methodology for the design of struct...
Summarization: An iterative method is proposed for the optimal material design of structures. The ca...
The design of composite structures is considered here. The approximation concepts approach is used t...
We obtain a measure representation for a functional arising in the context of optimal design problem...
A homogenization theorem is established for the problem of minimization of a quadratic integral func...
This article is devoted to the optimal design of the microstructure in composite materials, which ar...
The gradient-based structural optimization plays an important role in the multi- disciplinary optim...
This paper is concerned with optimal design problems with a special assumption on the coefficients o...
We are concerned with the optimal design of composite materials with periodic microstructures. A hom...
AbstractWe consider the relatively simple but non-trivial example of an optimal design problem with ...
The paper considers the problem of optimum distribution of two materials with a linear scalar ellipt...
The problem of the relaxation of optimal design problems for multiphase composite structures in the ...
We introduce a rigorously based numerical method for compliance minimization problems in the presenc...
In most shape optimization problems, the optimal solution does not belong to the set of genuine shap...
International audienceThis paper is concerned with the following optimal design problem:¯nd the dist...
In this work new homogenization results are used to introduce a methodology for the design of struct...
Summarization: An iterative method is proposed for the optimal material design of structures. The ca...
The design of composite structures is considered here. The approximation concepts approach is used t...
We obtain a measure representation for a functional arising in the context of optimal design problem...
A homogenization theorem is established for the problem of minimization of a quadratic integral func...
This article is devoted to the optimal design of the microstructure in composite materials, which ar...
The gradient-based structural optimization plays an important role in the multi- disciplinary optim...
This paper is concerned with optimal design problems with a special assumption on the coefficients o...
We are concerned with the optimal design of composite materials with periodic microstructures. A hom...
AbstractWe consider the relatively simple but non-trivial example of an optimal design problem with ...
The paper considers the problem of optimum distribution of two materials with a linear scalar ellipt...