Abstract. We study the gradient flow for the total variation functional, which arises in image pro-cessing and geometric applications. We propose a variational inequality weak formulation for the gradient flow, and establish well-posedness of the problem by the energy method. The main idea of our approach is to exploit the relationship between the regularized gradient flow (characterized by a small positive parameter ε, see (1.7)) and the minimal surface flow [21] and the prescribed mean curvature flow [16]. Since our approach is constructive and variational, finite element methods can be naturally applied to approximate weak solutions of the limiting gradient flow problem. We propose a fully discrete finite element method and establish con...
A proof of convergence is given for semi- and full discretizations of mean curvature flow of closed ...
This is the first of a series of papers devoted to a thorough analysis of the class of gradient flow...
This dissertation is devoted to the the numerical solution of the regularized fourth order total var...
We study the gradient flow for the total variation functional, which arises in image processing and...
We derive rates of convergence for regularization procedures (characterized by a parameter ɛ) and fi...
Banas L, Röckner M, Wilke A. Convergent numerical approximation of the stochastic total variation fl...
This paper studies the gradient flow of a regularized Mumford-Shah functional proposed by Ambrosio a...
(Communicated by Zhi-Qiang Wang) Abstract. We study the Osher-Solé-Vese model [11], which is the gr...
Abstract. We propose and analyze an algorithm for the solution of the L2-subgradient flow of the tot...
We consider the gradient flow of a one-homogeneous functional, whose dual involves the derivative of...
Abstract We study the Osher-Solé-Vese model [10], which is the gradient flow of an energy consistin...
We consider the gradient flow of a one-homogeneous functional, whose dual involves the derivative of...
We study numerical approximations for geometric evolution equations arising as gradient flows for en...
We summarize in this lectures some of our results about the Min-imizing Total Variation Flow, which ...
This thesis treats different methods and theoretical aspects of the calculus of variations and their...
A proof of convergence is given for semi- and full discretizations of mean curvature flow of closed ...
This is the first of a series of papers devoted to a thorough analysis of the class of gradient flow...
This dissertation is devoted to the the numerical solution of the regularized fourth order total var...
We study the gradient flow for the total variation functional, which arises in image processing and...
We derive rates of convergence for regularization procedures (characterized by a parameter ɛ) and fi...
Banas L, Röckner M, Wilke A. Convergent numerical approximation of the stochastic total variation fl...
This paper studies the gradient flow of a regularized Mumford-Shah functional proposed by Ambrosio a...
(Communicated by Zhi-Qiang Wang) Abstract. We study the Osher-Solé-Vese model [11], which is the gr...
Abstract. We propose and analyze an algorithm for the solution of the L2-subgradient flow of the tot...
We consider the gradient flow of a one-homogeneous functional, whose dual involves the derivative of...
Abstract We study the Osher-Solé-Vese model [10], which is the gradient flow of an energy consistin...
We consider the gradient flow of a one-homogeneous functional, whose dual involves the derivative of...
We study numerical approximations for geometric evolution equations arising as gradient flows for en...
We summarize in this lectures some of our results about the Min-imizing Total Variation Flow, which ...
This thesis treats different methods and theoretical aspects of the calculus of variations and their...
A proof of convergence is given for semi- and full discretizations of mean curvature flow of closed ...
This is the first of a series of papers devoted to a thorough analysis of the class of gradient flow...
This dissertation is devoted to the the numerical solution of the regularized fourth order total var...