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A theoretical and computational framework for isometry invariant recognition of point cloud data

Publication ,  Journal Article
Mémoli, F; Sapiro, G
Published in: Foundations of Computational Mathematics
July 1, 2005

Point clouds are one of the most primitive and fundamental manifold representations. Popular sources of point clouds are three-dimensional shape acquisition devices such as laser range scanners. Another important field where point clouds are found is in the representation of high-dimensional manifolds by samples. With the increasing popularity and very broad applications of this source of data, it is natural and important to work directly with this representation, without having to go through the intermediate and sometimes impossible and distorting steps of surface reconstruction. A geometric framework for comparing manifolds given by point clouds is presented in this paper. The underlying theory is based on Gromov-Hausdorff distances, leading to isometry invariant and completely geometric comparisons. This theory is embedded in a probabilistic setting as derived from random sampling of manifolds, and then combined with results on matrices of pairwise geodesic distances to lead to a computational implementation of the framework. The theoretical and computational results presented here are complemented with experiments for real three-dimensional shapes. © 2005 SFoCM.

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Published In

Foundations of Computational Mathematics

DOI

EISSN

1615-3383

ISSN

1615-3375

Publication Date

July 1, 2005

Volume

5

Issue

3

Start / End Page

313 / 347

Related Subject Headings

  • Numerical & Computational Mathematics
  • 49 Mathematical sciences
  • 46 Information and computing sciences
  • 08 Information and Computing Sciences
  • 01 Mathematical Sciences
 

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Mémoli, F., & Sapiro, G. (2005). A theoretical and computational framework for isometry invariant recognition of point cloud data. Foundations of Computational Mathematics, 5(3), 313–347. https://doi.org/10.1007/s10208-004-0145-y
Mémoli, F., and G. Sapiro. “A theoretical and computational framework for isometry invariant recognition of point cloud data.” Foundations of Computational Mathematics 5, no. 3 (July 1, 2005): 313–47. https://doi.org/10.1007/s10208-004-0145-y.
Mémoli F, Sapiro G. A theoretical and computational framework for isometry invariant recognition of point cloud data. Foundations of Computational Mathematics. 2005 Jul 1;5(3):313–47.
Mémoli, F., and G. Sapiro. “A theoretical and computational framework for isometry invariant recognition of point cloud data.” Foundations of Computational Mathematics, vol. 5, no. 3, July 2005, pp. 313–47. Scopus, doi:10.1007/s10208-004-0145-y.
Mémoli F, Sapiro G. A theoretical and computational framework for isometry invariant recognition of point cloud data. Foundations of Computational Mathematics. 2005 Jul 1;5(3):313–347.
Journal cover image

Published In

Foundations of Computational Mathematics

DOI

EISSN

1615-3383

ISSN

1615-3375

Publication Date

July 1, 2005

Volume

5

Issue

3

Start / End Page

313 / 347

Related Subject Headings

  • Numerical & Computational Mathematics
  • 49 Mathematical sciences
  • 46 Information and computing sciences
  • 08 Information and Computing Sciences
  • 01 Mathematical Sciences