Holomorphic vector fields and quadratic differentials on planar triangular meshes
Abstract
Given a triangulated region in the complex plane, a discrete vector field assigns a vector to every vertex. We call such a vector field holomorphic if it defines an infinitesimal deformation of the triangulation that preserves length cross ratios. We show that each holomorphic vector field can be constructed based on a discrete harmonic function in the sense of the cotan Laplacian. Moreover, to each holomorphic vector field we associate in a M\"obius invariant fashion a certain holomorphic quadratic differential. Here a quadratic differential is defined as an object that assigns a purely imaginary number to each interior edge. Then we derive a Weierstrass representation formula, which shows how a holomorphic quadratic differential can be used to construct a discrete minimal surface with prescribed Gau{\ss} map and prescribed Hopf differential.
Cite
@article{arxiv.1506.08099,
title = {Holomorphic vector fields and quadratic differentials on planar triangular meshes},
author = {Wai Yeung Lam and Ulrich Pinkall},
journal= {arXiv preprint arXiv:1506.08099},
year = {2015}
}
Comments
17 pages; final version, to appear in "Advances in Discrete Differential Geometry", ed. A. I. Bobenko, Springer, 2016; references added