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Spectral Convergence of the connection Laplacian from random samples

Author(s): Singer, Amit; Wu, Hau-tieng

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dc.contributor.authorSinger, Amit-
dc.contributor.authorWu, Hau-tieng-
dc.date.accessioned2019-08-29T17:01:35Z-
dc.date.available2019-08-29T17:01:35Z-
dc.date.issued2017-03en_US
dc.identifier.citationSpectral convergence of the connection Laplacian from random samples. Amit Singer, Hau-Tieng Wu, Information and Inference: A Journal of the IMA, Volume 6, Issue 1, 1 March 2017, Pages 58–123, https://doi.org/10.1093/imaiai/iaw016en_US
dc.identifier.urihttp://arks.princeton.edu/ark:/88435/pr16h96-
dc.description.abstractSpectral methods that are based on eigenvectors and eigenvalues of discrete graph Laplacians, such as Diffusion Maps and Laplacian Eigenmaps are often used for manifold learning and non-linear dimensionality reduction. It was previously shown by Belkin and Niyogi \cite{belkin_niyogi:2007} that the eigenvectors and eigenvalues of the graph Laplacian converge to the eigenfunctions and eigenvalues of the Laplace-Beltrami operator of the manifold in the limit of infinitely many data points sampled independently from the uniform distribution over the manifold. Recently, we introduced Vector Diffusion Maps and showed that the connection Laplacian of the tangent bundle of the manifold can be approximated from random samples. In this paper, we present a unified framework for approximating other connection Laplacians over the manifold by considering its principle bundle structure. We prove that the eigenvectors and eigenvalues of these Laplacians converge in the limit of infinitely many independent random samples. We generalize the spectral convergence results to the case where the data points are sampled from a non-uniform distribution, and for manifolds with and without boundary.en_US
dc.format.extent58-123en_US
dc.language.isoen_USen_US
dc.relation.ispartofInformation and Inference: A Journal of the IMAen_US
dc.rightsAuthor's manuscripten_US
dc.titleSpectral Convergence of the connection Laplacian from random samplesen_US
dc.typeJournal Articleen_US
dc.date.eissued2016-12-24en_US
pu.type.symplectichttp://www.symplectic.co.uk/publications/atom-terms/1.0/journal-articleen_US

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