The structure theorem of Hadamard–Zolésio states that the derivative of a shape functional is a distribution on the boundary of the domain depending only on the normal perturbations of a smooth enough boundary. Actually the domain representation, also known as distributed shape derivative, is more general than the boundary expression as it is well-defined for shapes having a lower regularity. It is customary in the shape optimization literature to assume regularity of the domains and use the boundary expression of the shape derivative for numerical algorithms. In this paper we describe several advantages of the distributed shape derivative in terms of generality, easiness of computation and numerical implementation. We identify a tensor rep...
We consider the optimal distribution of several elastic materials in a fixed working domai...
33 pagesInternational audienceWe consider the optimal distribution of several elastic materials in a...
AbstractThe object of this paper is to study the Shape gradient and the Shape Hessian by the Velocit...
The well-known structure theorem of Hadamard-Zolésio states that the derivative of a shape functiona...
In this paper we study an abstract framework for computing shape derivatives of functionals subject ...
During the last years, the necessity of optimizing the efficiency of structures, vehicles, etc. has ...
Abstract. A general framework for calculating shape derivatives for optimiza-tion problems with part...
This paper concerns the problem identifying geometrical boundary shapes of domains in which elliptic...
A general framework for calculating shape derivatives for domain optimizationproblems with partial d...
This paper studies the relationship between the material derivative method, the shape derivative me...
Abstract. The shape derivative of a functional related to a Bernoulli problem is derived without usi...
In this paper, we develop a shape optimization-based algorithm for the electrical impedance tomograp...
International audienceThis chapter is an introduction to shape and topology optimization, with a par...
In this work, we consider again the shape derivative formula for a volume cost functional which we s...
We consider the optimal distribution of several elastic materials in a fixed working domai...
33 pagesInternational audienceWe consider the optimal distribution of several elastic materials in a...
AbstractThe object of this paper is to study the Shape gradient and the Shape Hessian by the Velocit...
The well-known structure theorem of Hadamard-Zolésio states that the derivative of a shape functiona...
In this paper we study an abstract framework for computing shape derivatives of functionals subject ...
During the last years, the necessity of optimizing the efficiency of structures, vehicles, etc. has ...
Abstract. A general framework for calculating shape derivatives for optimiza-tion problems with part...
This paper concerns the problem identifying geometrical boundary shapes of domains in which elliptic...
A general framework for calculating shape derivatives for domain optimizationproblems with partial d...
This paper studies the relationship between the material derivative method, the shape derivative me...
Abstract. The shape derivative of a functional related to a Bernoulli problem is derived without usi...
In this paper, we develop a shape optimization-based algorithm for the electrical impedance tomograp...
International audienceThis chapter is an introduction to shape and topology optimization, with a par...
In this work, we consider again the shape derivative formula for a volume cost functional which we s...
We consider the optimal distribution of several elastic materials in a fixed working domai...
33 pagesInternational audienceWe consider the optimal distribution of several elastic materials in a...
AbstractThe object of this paper is to study the Shape gradient and the Shape Hessian by the Velocit...