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Hauptverfasser: Chen, Jiayi, Jebelli, Mohammad Javad Latifi, Rockmore, Daniel N.
Format: Preprint
Veröffentlicht: 2025
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Online-Zugang:https://arxiv.org/abs/2511.02873
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author Chen, Jiayi
Jebelli, Mohammad Javad Latifi
Rockmore, Daniel N.
author_facet Chen, Jiayi
Jebelli, Mohammad Javad Latifi
Rockmore, Daniel N.
contents We consider the problem of estimating curvature where the data can be viewed as a noisy sample from an underlying manifold. For manifolds of dimension greater than one there are multiple definitions of local curvature, each suggesting a different estimation process for a given data set. Recently, there has been progress in proving that estimates of ``local point cloud curvature" converge to the related smooth notion of local curvature as the density of the point cloud approaches infinity. Herein we investigate practical limitations of such convergence theorems and discuss the significant impact of bias in such estimates as reported in recent literature. We provide theoretical arguments for the fact that bias increases drastically in higher dimensions, so much so that in high dimensions, the probability that a naive curvature estimate lies in a small interval near the true curvature could be near zero. We present a probabilistic framework that enables the construction of more accurate estimators of curvature for arbitrary noise models. The efficacy of our technique is supported with experiments on spheres of dimension as large as twelve.
format Preprint
id arxiv_https___arxiv_org_abs_2511_02873
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Curvature of high-dimensional data
Chen, Jiayi
Jebelli, Mohammad Javad Latifi
Rockmore, Daniel N.
Statistics Theory
53A70, 53A07
We consider the problem of estimating curvature where the data can be viewed as a noisy sample from an underlying manifold. For manifolds of dimension greater than one there are multiple definitions of local curvature, each suggesting a different estimation process for a given data set. Recently, there has been progress in proving that estimates of ``local point cloud curvature" converge to the related smooth notion of local curvature as the density of the point cloud approaches infinity. Herein we investigate practical limitations of such convergence theorems and discuss the significant impact of bias in such estimates as reported in recent literature. We provide theoretical arguments for the fact that bias increases drastically in higher dimensions, so much so that in high dimensions, the probability that a naive curvature estimate lies in a small interval near the true curvature could be near zero. We present a probabilistic framework that enables the construction of more accurate estimators of curvature for arbitrary noise models. The efficacy of our technique is supported with experiments on spheres of dimension as large as twelve.
title Curvature of high-dimensional data
topic Statistics Theory
53A70, 53A07
url https://arxiv.org/abs/2511.02873