Implicit Surface Reconstruction With Radial Basis Functions Via PDEs

Authors

Xiao Yan Liu, Taiyuan University of Technology
Hui Wang, Washington University in St. LouisFollow
C. S. Chen, University of Southern MississippiFollow
Qing Wang, Washington University in St. Louis
Xiaoshuang Zhou, Shaanxi Provincial People's Hospital
Yong Wang, Washington University in St. Louis

Document Type

Article

Publication Date

1-1-2020

Department

Mathematics

School

Mathematics and Natural Sciences

Abstract

© 2019 We propose a partial differential equations-based algorithm for the 3D implicit surface reconstruction from a set of scattered cloud data. In the solution process, the method of approximate particular solutions with the IMQ radial basis function is employed for solving the modified Helmholtz or Poisson equation with a constant Dirichlet boundary condition. We also consider to repair the surfaces when a certain region of cloud data points are missing. The selection of several parameters is studied for the optimal recovery of the surfaces. Four examples are presented to validate the effectiveness of the proposed method.

Publication Title

Engineering Analysis with Boundary Elements

Volume

110

First Page

95

Last Page

103

Recommended Citation

Liu, X., Wang, H., Chen, C., Wang, Q., Zhou, X., Wang, Y. (2020). Implicit Surface Reconstruction With Radial Basis Functions Via PDEs. Engineering Analysis with Boundary Elements, 110, 95-103.
Available at: https://aquila.usm.edu/fac_pubs/17907