We study numerical approximations for geometric evolution equations arising as gradient flows for energy functionals that are quadratic in the principal curvatures of a two-dimensional surface. Besides the well-known Willmore and Helfrich flows, we will also consider flows involving the Gaussian curvature of the surface. Boundary conditions for these flows are highly nonlinear, and we use a variational approach to derive weak formulations, which naturally can be discretized with the help of a mixed finite element method. Our approach uses a parametric finite element method, which can be shown to lead to good mesh properties. We prove stability estimates for a semidiscrete (discrete in space, continuous in time) version of the method and sho...
We study the gradient flow for the total variation functional, which arises in image processing and...
Geometric gradient flows of energy functionals involving the curvature of a given object have become...
Parametric finite elements lead to very efficient numerical methods for surface evolution equations....
We study numerical approximations for geometric evolution equations arising as gradient flows for en...
For a hypersurface in ℝ3, Willmore flow is defined as the L2-gradient flow of the classical Willmore...
Abstract. We present various variational approximations of Willmore flow in Rd, d = 2, 3. As well as...
A novel variational time discretization of isotropic and anisotropic Willmore flow combined with a s...
A new stable continuous-in-time semidiscrete parametric finite element method for Willmore flow is i...
A proof of convergence is given for semi- and full discretizations of mean curvature flow of closed ...
© 2016 Society for Industrial and Applied Mathematics.A new stable continuous-in-time semidiscrete p...
We present a variational formulation of motion by minus the Laplacian of curvature and mean curvatur...
We discuss variational problems concerning Willmore-type energies of curves and surfaces. By Willmor...
Abstract. We study the gradient flow for the total variation functional, which arises in image pro-c...
We consider the numerical approximation of geometric Partial Differential Equations (PDEs) defined o...
The Willmore energy of a surface, ∫(H^2 - K) dA, as a function of mean and Gaussian curvature, captu...
We study the gradient flow for the total variation functional, which arises in image processing and...
Geometric gradient flows of energy functionals involving the curvature of a given object have become...
Parametric finite elements lead to very efficient numerical methods for surface evolution equations....
We study numerical approximations for geometric evolution equations arising as gradient flows for en...
For a hypersurface in ℝ3, Willmore flow is defined as the L2-gradient flow of the classical Willmore...
Abstract. We present various variational approximations of Willmore flow in Rd, d = 2, 3. As well as...
A novel variational time discretization of isotropic and anisotropic Willmore flow combined with a s...
A new stable continuous-in-time semidiscrete parametric finite element method for Willmore flow is i...
A proof of convergence is given for semi- and full discretizations of mean curvature flow of closed ...
© 2016 Society for Industrial and Applied Mathematics.A new stable continuous-in-time semidiscrete p...
We present a variational formulation of motion by minus the Laplacian of curvature and mean curvatur...
We discuss variational problems concerning Willmore-type energies of curves and surfaces. By Willmor...
Abstract. We study the gradient flow for the total variation functional, which arises in image pro-c...
We consider the numerical approximation of geometric Partial Differential Equations (PDEs) defined o...
The Willmore energy of a surface, ∫(H^2 - K) dA, as a function of mean and Gaussian curvature, captu...
We study the gradient flow for the total variation functional, which arises in image processing and...
Geometric gradient flows of energy functionals involving the curvature of a given object have become...
Parametric finite elements lead to very efficient numerical methods for surface evolution equations....