We present a variational framework for shape optimization problems that establishes clear and explicit connections among the continuous formulation, its full discretization and the resulting linear algebraic systems. Our approach hinges on the following essential features: shape differential calculus, a semi-implicit time discretization and a finite element method for space discretization. We use shape differential calculus to express variations of bulk and surface energies with respect to domain changes. The semi-implicit time discretization allows us to track the domain boundary without an explicit parametrization, and has the flexibility to choose different descent directions by varying the scalar product used for the computation of norm...
Surface diffusion is a (fourth order highly nonlinear) geometric driven motion of a surface with nor...
A numerical analysis technique is presented for solving optimization prob-lems of geometrical domain...
Abstract. Often, the unknown diffusivity in diffusive processes is structured by piecewise constant ...
We present a variational framework for shape optimization problems that establishes clear and explic...
We introduce a novel computational method for a Mumford–Shah functional, which decomposes a given im...
We introduce a novel computational method for a Mumford-Shah functional, which decomposes a given im...
A Variational Shape Optimization Approach for Image Segmentation with a Mumford-Shah Functional We i...
Image segmentation is one of the fundamental problems in image processing. The goal is to partition ...
Abstract. A general framework for calculating shape derivatives for optimiza-tion problems with part...
In the formulation of shape optimization problems, multiple geometric constraint functionals involve...
Starting from Hadamard's and Garabedian's works, the shape optimisation was a part of classical cal...
In the present paper we consider the minimization of gradient tracking functionals defined on a comp...
It is well known among practitioners that the numerical solution of shape optimization problems cons...
In this paper we investigate and compare different gradient algorithms designed for the domain expre...
Abstract. Shape optimization based on surface gradients and the Hadarmard-form is considered for a c...
Surface diffusion is a (fourth order highly nonlinear) geometric driven motion of a surface with nor...
A numerical analysis technique is presented for solving optimization prob-lems of geometrical domain...
Abstract. Often, the unknown diffusivity in diffusive processes is structured by piecewise constant ...
We present a variational framework for shape optimization problems that establishes clear and explic...
We introduce a novel computational method for a Mumford–Shah functional, which decomposes a given im...
We introduce a novel computational method for a Mumford-Shah functional, which decomposes a given im...
A Variational Shape Optimization Approach for Image Segmentation with a Mumford-Shah Functional We i...
Image segmentation is one of the fundamental problems in image processing. The goal is to partition ...
Abstract. A general framework for calculating shape derivatives for optimiza-tion problems with part...
In the formulation of shape optimization problems, multiple geometric constraint functionals involve...
Starting from Hadamard's and Garabedian's works, the shape optimisation was a part of classical cal...
In the present paper we consider the minimization of gradient tracking functionals defined on a comp...
It is well known among practitioners that the numerical solution of shape optimization problems cons...
In this paper we investigate and compare different gradient algorithms designed for the domain expre...
Abstract. Shape optimization based on surface gradients and the Hadarmard-form is considered for a c...
Surface diffusion is a (fourth order highly nonlinear) geometric driven motion of a surface with nor...
A numerical analysis technique is presented for solving optimization prob-lems of geometrical domain...
Abstract. Often, the unknown diffusivity in diffusive processes is structured by piecewise constant ...