Harmonic global parametrization with rational holonomy

Alon Bright, Edward Chien, Ofir Weber

Research output: Contribution to journalConference articlepeer-review

Abstract

We present a method for locally injective seamless parametrization of triangular mesh surfaces of arbitrary genus, with or without boundaries, given desired cone points and rational holonomy angles (multiples of 2π/q for some positive integer q). The basis of the method is an elegant generalization of Tutte's "spring embedding theorem" to this setting. The surface is cut to a disk and a harmonic system with appropriate rotation constraints is solved, resulting in a harmonic global parametrization (HGP) method. We show a remarkable result: that if the triangles adjacent to the cones and boundary are positively oriented, and the correct cone and turning angles are induced, then the resulting map is guaranteed to be locally injective. Guided by this result, we solve the linear system by convex optimization, imposing convexification frames on only the boundary and cone triangles, and minimizing a Laplacian energy to achieve harmonicity. We compare HGP to state-of-the-art methods and see that it is the most robust, and is significantly faster than methods with comparable robustness.

Original languageEnglish
Article number89
JournalACM Transactions on Graphics
Volume36
Issue number4
DOIs
StatePublished - 2017
EventACM SIGGRAPH 2017 - Los Angeles, United States
Duration: 30 Jul 20173 Aug 2017

Keywords

  • Discrete harmonic
  • Global parametrization
  • Injective maps
  • Mesh parametrization

All Science Journal Classification (ASJC) codes

  • Computer Graphics and Computer-Aided Design

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