Discrete Surface Ricci Flow (II)


Astro-Math Bldg. 302

Day and Time: 

2017-04-10 (Monday) 14:20 - 15:10


A discrete surface is a simplicial complex which is locally isometric to $R^2$ or upper half plane, and we can define Gaussian curvature and circle packing metric on it, then we’ll explain the discrete Gauss-Bonnet theorem. Also, we can compute the relation between length of simplices and the metric and define Ricci flow, then I’ll prove the convergence of the discrete Ricci flow.