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In [3], the authors used the Legendre transform to give a tractable method for studying Topological Data Analysis (TDA) in terms of sums of Gaussian kernels. In this paper, we prove a variant for sums of cosine similarity-based kernel functions, which requires considering the more general "\(c\)-transform" from optimal transport theory [16]. We then apply these methods to a point cloud arising from a recent breakthrough study, which exhibits a toroidal structure in the brain activity of rats [11]. A key part of this application is that the transport map and transformed density function arising from the theorem replace certain delicate preprocessing steps related to density-based denoising and subsampling.
Details
Identifier / keyword
Title
Alpha shapes and optimal transport on the sphere
Author
arXiv.org; Ithaca
Publication year
2024
Publication date
Dec 5, 2024
Section
Mathematics; Statistics
Source
arXiv.org
Place of publication
Ithaca
Country of publication
United States
University/institution
Cornell University Library arXiv.org
Publication subject
e-ISSN
2331-8422
Source type
Working Paper
Language of publication
English
Document type
Working Paper
Publication history
Online publication date
2024-12-06
Milestone dates
2024-12-05 (Submission v1)
Publication history
First posting date
06 Dec 2024
ProQuest document ID
3141681197
Document URL
https://www.proquest.com/working-papers/alpha-shapes-optimal-transport-on-sphere/docview/3141681197/se-2?accountid=208611
Full text outside of ProQuest
Copyright
© 2024. This work is published under http://arxiv.org/licenses/nonexclusive-distrib/1.0/ (the “License”). Notwithstanding the ProQuest Terms and Conditions, you may use this content in accordance with the terms of the License.
Last updated
2024-12-07
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