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Distance functions and geodesics on submanifolds of ℝ d and point clouds

Publication ,  Journal Article
Mémoli, F; Sapiro, G
Published in: SIAM Journal on Applied Mathematics
September 30, 2005

A theoretical and computational framework for computing intrinsic distance functions and geodesics on submanifolds of ℝ d given by point clouds is introduced and developed in this paper. The basic idea is that, as shown here, intrinsic distance functions and geodesics on general co-dimension submanifolds of ℝ d can be accurately approximated by extrinsic Euclidean ones computed inside a thin offset band surrounding the manifold. This permits the use of computationally optimal algorithms for computing distance functions in Cartesian grids. We use these algorithms, modified to deal with spaces with boundaries, and obtain a computationally optimal approach also for the case of intrinsic distance functions on submanifolds of ℝ d. For point clouds, the offset band is constructed without the need to explicitly find the underlying manifold, thereby computing intrinsic distance functions and geodesics on point clouds while skipping the manifold reconstruction step. The case of point clouds representing noisy samples of a submanifold of Euclidean space is studied as well. All the underlying theoretical results are presented along with experimental examples for diverse applications and comparisons to graph-based distance algorithms. © 2005 Society for Industrial and Applied Mathematics.

Duke Scholars

Published In

SIAM Journal on Applied Mathematics

DOI

ISSN

0036-1399

Publication Date

September 30, 2005

Volume

65

Issue

4

Start / End Page

1227 / 1260

Related Subject Headings

  • Applied Mathematics
  • 4901 Applied mathematics
  • 0102 Applied Mathematics
 

Citation

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Mémoli, F., & Sapiro, G. (2005). Distance functions and geodesics on submanifolds of ℝ d and point clouds. SIAM Journal on Applied Mathematics, 65(4), 1227–1260. https://doi.org/10.1137/S003613990342877X
Mémoli, F., and G. Sapiro. “Distance functions and geodesics on submanifolds of ℝ d and point clouds.” SIAM Journal on Applied Mathematics 65, no. 4 (September 30, 2005): 1227–60. https://doi.org/10.1137/S003613990342877X.
Mémoli F, Sapiro G. Distance functions and geodesics on submanifolds of ℝ d and point clouds. SIAM Journal on Applied Mathematics. 2005 Sep 30;65(4):1227–60.
Mémoli, F., and G. Sapiro. “Distance functions and geodesics on submanifolds of ℝ d and point clouds.” SIAM Journal on Applied Mathematics, vol. 65, no. 4, Sept. 2005, pp. 1227–60. Scopus, doi:10.1137/S003613990342877X.
Mémoli F, Sapiro G. Distance functions and geodesics on submanifolds of ℝ d and point clouds. SIAM Journal on Applied Mathematics. 2005 Sep 30;65(4):1227–1260.

Published In

SIAM Journal on Applied Mathematics

DOI

ISSN

0036-1399

Publication Date

September 30, 2005

Volume

65

Issue

4

Start / End Page

1227 / 1260

Related Subject Headings

  • Applied Mathematics
  • 4901 Applied mathematics
  • 0102 Applied Mathematics