English

Consistent Computation of First- and Second-Order Differential Quantities for Surface Meshes

Numerical Analysis 2016-03-23 v2 Differential Geometry

Abstract

Differential quantities, including normals, curvatures, principal directions, and associated matrices, play a fundamental role in geometric processing and physics-based modeling. Computing these differential quantities consistently on surface meshes is important and challenging, and some existing methods often produce inconsistent results and require ad hoc fixes. In this paper, we show that the computation of the gradient and Hessian of a height function provides the foundation for consistently computing the differential quantities. We derive simple, explicit formulas for the transformations between the first- and second-order differential quantities (i.e., normal vector and principal curvature tensor) of a smooth surface and the first- and second-order derivatives (i.e., gradient and Hessian) of its corresponding height function. We then investigate a general, flexible numerical framework to estimate the derivatives of the height function based on local polynomial fittings formulated as weighted least squares approximations. We also propose an iterative fitting scheme to improve accuracy. This framework generalizes polynomial fitting and addresses some of its accuracy and stability issues, as demonstrated by our theoretical analysis as well as experimental results.

Keywords

Cite

@article{arxiv.0803.2331,
  title  = {Consistent Computation of First- and Second-Order Differential Quantities for Surface Meshes},
  author = {Xiangmin Jiao and Hongyuan Zha},
  journal= {arXiv preprint arXiv:0803.2331},
  year   = {2016}
}

Comments

12 pages, 12 figures, ACM Solid and Physical Modeling Symposium, June 2008

R2 v1 2026-06-21T10:21:54.161Z