Curve Shortening Flow in Arbitrary Dimensional Euclidian Space

## Abstract We consider the evolution of parametric curves by anisotropic mean curvature flow in ℝ^__n__^ for an arbitrary __n__⩾2. After the introduction of a spatial discretization, we prove convergence estimates for the proposed finite‐element model. Numerical tests and simulations based on a fu

We consider the model problem where a curve in R 3 moves according to the mean curvature flow (the curve shortening flow). We construct a semi-Lagrangian scheme based on the Feynman-Kac representation formula of the solutions of the related level set geometric equation. The first step is to obtain a

A new definition of closed curves in n-dimensional discrete space is proposed. This definition can be viewed as a generalization of closed quasi curves and is intended to overcome the limitations of the known definitions for practical purposes. Following the proposed definition, a set of points form