Open Access
2007 A statistical approach to persistent homology
Peter Bubenik, Peter T. Kim
Homology Homotopy Appl. 9(2): 337-362 (2007).

Abstract

Assume that a finite set of points is randomly sampled from a subspace of a metric space. Recent advances in computational topology have provided several approaches to recovering the geometric and topological properties of the underlying space. In this paper we take a statistical approach to this problem. We assume that the data is randomly sampled from an unknown probability distribution. We define two filtered complexes with which we can calculate the persistent homology of a probability distribution. Using statistical estimators for samples from certain families of distributions, we show that we can recover the persistent homology of the underlying distribution.

Citation

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Peter Bubenik. Peter T. Kim. "A statistical approach to persistent homology." Homology Homotopy Appl. 9 (2) 337 - 362, 2007.

Information

Published: 2007
First available in Project Euclid: 23 January 2008

zbMATH: 1136.55004
MathSciNet: MR2366953

Subjects:
Primary: 55N99 , 62H11

Keywords: directional statistics , expected persistent homology , parametric statistics , Persistent homology , point cloud data

Rights: Copyright © 2007 International Press of Boston

Vol.9 • No. 2 • 2007
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