论文信息 - Discrete Affine Minimal Surfaces with Indefinite Metric

Discrete Affine Minimal Surfaces with Indefinite Metric

Inspired by the Weierstrass representation of smooth affine minimal surfaces with indefinite metric, we propose a constructive process producing a large class of discrete surfaces that we call discrete affine minimal surfaces. We show that they are critical points of an affine area functional defined on the space of quadrangular discrete surfaces. The construction makes use of asymptotic coordinates and allows defining the discrete analogs of some differential geometric objects, such as the normal and co normal vector fields, the cubic form and the compatibility equations.

Thomas Lewiner | Marcos Craizer | Henri Anciaux

[1] Guillermo Sapiro,et al. Area-Based Medial Axis of Planar Curves , 2003 .

[2] A. Bobenko,et al. Discrete differential geometry. Consistency as integrability , 2005, math/0504358.

[3] Eugenio Calabi,et al. Hypersurfaces with Maximal Affinely Invariant Area , 1982 .

[4] Marcos Craizer,et al. Area Distances of Convex Plane Curves and Improper Affine Spheres , 2007, SIAM J. Imaging Sci..

[5] Su Buqing,et al. Affine differential geometry , 1983 .

[6] A. Bobenko,et al. Minimal surfaces from circle patterns : Geometry from combinatorics , 2003, math/0305184.

[7] Wolfgang K. Schief,et al. Affine Spheres: Discretization via Duality Relations , 1999, Exp. Math..

[8] A. Bobenko,et al. Discrete Differential Geometry: Integrable Structure , 2008 .

[9] Guosong Zhao,et al. Global Affine Differential Geometry of Hypersurfaces , 1993 .

[10] H. Urakawa,et al. Discrete improper affine spheres , 2003 .