Publication Date:
2017
Short description:
Discrete varifolds and surface approximation / Buet, Blanche; Leonardi, Gian Paolo; Masnou, Simon. - (2017), pp. 159-170.
abstract:
In this chapter, we give a brief account of the notion of discrete varifolds, which are
general and flexible tools to represent in a common framework regular surfaces and a large
category of discrete representations of surfaces, eg point clouds, triangulated surfaces or
volumetric representations. In this setting, a new notion of discrete mean curvature can be
defined, relying only on the varifold structure and not on any specific feature of the
underlying discretization type. This notion of discrete mean curvature is obtained thanks to a regularization of the so-called first variation of the varifold, it is easy to compute, and we prove that it has nice convergence properties. We illustrate this notion on 2D and 3D examples.
general and flexible tools to represent in a common framework regular surfaces and a large
category of discrete representations of surfaces, eg point clouds, triangulated surfaces or
volumetric representations. In this setting, a new notion of discrete mean curvature can be
defined, relying only on the varifold structure and not on any specific feature of the
underlying discretization type. This notion of discrete mean curvature is obtained thanks to a regularization of the so-called first variation of the varifold, it is easy to compute, and we prove that it has nice convergence properties. We illustrate this notion on 2D and 3D examples.
Iris type:
Capitolo/Saggio
Keywords:
Varifolds, Surface approximation, Mean curvature, Discrete curvature
List of contributors:
Buet, Blanche; Leonardi, Gian Paolo; Masnou, Simon
Book title:
Topological Optimization and Optimal Transport: In the Applied Sciences