Litcius/Paper detail

Efficient and robust discrete conformal equivalence with boundary

Marcel Campen, Ryan Capouellez, Hanxiao Shen, Leyi Zhu, Daniele Panozzo, Denis Zorin

2021ACM Transactions on Graphics31 citationsDOI

Abstract

We describe an efficient algorithm to compute a discrete metric with prescribed Gaussian curvature at all interior vertices and prescribed geodesic curvature along the boundary of a mesh. The metric is (discretely) conformally equivalent to the input metric. Its construction is based on theory developed in [Gu et al. 2018b] and [Springborn 2020], relying on results on hyperbolic ideal Delaunay triangulations. Generality is achieved by considering the surface's intrinsic triangulation as a degree of freedom, and particular attention is paid to the proper treatment of surface boundaries. While via a double cover approach the case with boundary can be reduced to the case without boundary quite naturally, the implied symmetry of the setting causes additional challenges related to stable Delaunay-critical configurations that we address explicitly. We furthermore explore the numerical limits of the approach and derive continuous maps from the discrete metrics.

Topics & Concepts

Delaunay triangulationMathematicsGaussian curvatureGeodesicBoundary (topology)CurvatureConformal mapMetric (unit)Constrained Delaunay triangulationMathematical analysisGeometryEconomicsOperations managementComputational Geometry and Mesh GenerationComputer Graphics and Visualization Techniques3D Shape Modeling and Analysis