English

On a new conformal functional for simplicial surfaces

Differential Geometry 2017-08-25 v1

Abstract

We introduce a smooth quadratic conformal functional and its weighted version W2=eβ2(e)W2,w=e(ni+nj)β2(e),W_2=\sum_e \beta^2(e)\quad W_{2,w}=\sum_e (n_i+n_j)\beta^2(e), where β(e)\beta(e) is the extrinsic intersection angle of the circumcircles of the triangles of the mesh sharing the edge e=(ij)e=(ij) and nin_i is the valence of vertex ii. Besides minimizing the squared local conformal discrete Willmore energy WW this functional also minimizes local differences of the angles β\beta. We investigate the minimizers of this functionals for simplicial spheres and simplicial surfaces of nontrivial topology. Several remarkable facts are observed. In particular for most of randomly generated simplicial polyhedra the minimizers of W2W_2 and W2,wW_{2,w} are inscribed polyhedra. We demonstrate also some applications in geometry processing, for example, a conformal deformation of surfaces to the round sphere. A partial theoretical explanation through quadratic optimization theory of some observed phenomena is presented.

Keywords

Cite

@article{arxiv.1505.08054,
  title  = {On a new conformal functional for simplicial surfaces},
  author = {Alexander I. Bobenko and Martin P. Weidner},
  journal= {arXiv preprint arXiv:1505.08054},
  year   = {2017}
}

Comments

14 pages, 8 figures, to appear in the proceedings of "Curves and Surfaces, 8th International Conference", June 2014

R2 v1 2026-06-22T09:43:52.921Z