The present paper is concerned with investigating the capability of the smoothness preserving fictitious domain method from [22] to shape optimization problems. We consider the problem of maximizing the Dirichlet energy functional in the class of all simply connected domains with fixed volume, where the state equation involves an elliptic second order differential operator with non-constant coefficients. Numerical experiments in two dimensions validate that we arrive at a fast and robust algorithm for the solution of the considered class of problems. The proposed method keeps applicable for three dimensional shape optimization problems
A new numerical method based on fictitious domain methods for shape optimization problems governed b...
The dissertation concerns numerical methods of shape optimization for nonlinear elliptic boundary va...
International audienceWe propose a smooth fictitious domain/multiresolution method for enhancing the...
The present paper is concerned with investigating the capability of the smoothness preserving fictit...
The present article is concerned with the numerical solution of a free boundary problem for an ellip...
The main focus of this thesis is the smoothness of the solutions provided by fictitious domain metho...
summary:We deal with practical aspects of an approach to the numerical realization of optimal shape ...
We consider PDE constrained shape optimization in the framework of finite element discretization of ...
AbstractThis contribution combines a shape optimization approach to free boundary value problems of ...
We consider shape optimization problems, where the state is governed by elliptic partial differentia...
summary:A model shape optimal design in $\mathbb{R}^2$ is solved by means of the penalty method with...
We propose a shape optimization method over a fixed grid. Nodes at the intersection with the fixed g...
International audienceIn this paper, we focus on numerical aspects of structural optimization. We co...
A numerical analysis technique is presented for solving optimization prob-lems of geometrical domain...
In the present paper we consider the numerical solution of shape optimization problems which arise ...
A new numerical method based on fictitious domain methods for shape optimization problems governed b...
The dissertation concerns numerical methods of shape optimization for nonlinear elliptic boundary va...
International audienceWe propose a smooth fictitious domain/multiresolution method for enhancing the...
The present paper is concerned with investigating the capability of the smoothness preserving fictit...
The present article is concerned with the numerical solution of a free boundary problem for an ellip...
The main focus of this thesis is the smoothness of the solutions provided by fictitious domain metho...
summary:We deal with practical aspects of an approach to the numerical realization of optimal shape ...
We consider PDE constrained shape optimization in the framework of finite element discretization of ...
AbstractThis contribution combines a shape optimization approach to free boundary value problems of ...
We consider shape optimization problems, where the state is governed by elliptic partial differentia...
summary:A model shape optimal design in $\mathbb{R}^2$ is solved by means of the penalty method with...
We propose a shape optimization method over a fixed grid. Nodes at the intersection with the fixed g...
International audienceIn this paper, we focus on numerical aspects of structural optimization. We co...
A numerical analysis technique is presented for solving optimization prob-lems of geometrical domain...
In the present paper we consider the numerical solution of shape optimization problems which arise ...
A new numerical method based on fictitious domain methods for shape optimization problems governed b...
The dissertation concerns numerical methods of shape optimization for nonlinear elliptic boundary va...
International audienceWe propose a smooth fictitious domain/multiresolution method for enhancing the...