Litcius/Paper detail

Polygon Laplacian Made Simple

A. Bunge, Philipp Herholz, Misha Kazhdan, Mario Botsch

2020Computer Graphics Forum24 citationsDOIOpen Access PDF

Abstract

Abstract The discrete Laplace‐Beltrami operator for surface meshes is a fundamental building block for many (if not most) geometry processing algorithms. While Laplacians on triangle meshes have been researched intensively, yielding the cotangent discretization as the de‐facto standard, the case of general polygon meshes has received much less attention. We present a discretization of the Laplace operator which is consistent with its expression as the composition of divergence and gradient operators, and is applicable to general polygon meshes, including meshes with non‐convex, and even non‐planar, faces. By virtually inserting a carefully placed point we implicitly refine each polygon into a triangle fan, but then hide the refinement within the matrix assembly. The resulting operator generalizes the cotangent Laplacian, inherits its advantages, and is empirically shown to be on par or even better than the recent polygon Laplacian of Alexa and Wardetzky [AW11] — while being simpler to compute.

Topics & Concepts

Polygon meshPolygon (computer graphics)Laplace operatorVolume meshMathematicsDiscretizationRegular polygonEquiangular polygonSimple polygonComputer scienceGeometryMesh generationFinite element methodMathematical analysisFrame (networking)PhysicsThermodynamicsTelecommunications3D Shape Modeling and AnalysisComputer Graphics and Visualization TechniquesComputational Geometry and Mesh Generation