Towards a theoretical foundation for Laplacian-based manifold methods
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摘要
In recent years manifold methods have attracted a considerable amount of attention in machine learning. However most algorithms in that class may be termed “manifold-motivated” as they lack any explicit theoretical guarantees. In this paper we take a step towards closing the gap between theory and practice for a class of Laplacian-based manifold methods. These methods utilize the graph Laplacian associated to a data set for a variety of applications in semi-supervised learning, clustering, data representation.We show that under certain conditions the graph Laplacian of a point cloud of data samples converges to the Laplace–Beltrami operator on the underlying manifold. Theorem 3.1 contains the first result showing convergence of a random graph Laplacian to the manifold Laplacian in the context of machine learning.
论文关键词:Laplace–Beltrami operator,Graph Laplacian,Manifold methods
论文评审过程:Received 15 September 2006, Revised 11 May 2007, Available online 30 August 2007.
论文官网地址:https://doi.org/10.1016/j.jcss.2007.08.006