Locality pursuit embedding

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摘要

Dimensionality reduction techniques are widespread in pattern recognition research. Principal component analysis, as one of the most popular methods used, is optimal when the data points reside on a linear subspace. Nevertheless, it may fail to preserve the local structure if the data reside on some nonlinear manifold, which is indisputably important in many real applications, especially when nearest-neighbor search is involved. In this paper, we propose locality pursuit embedding, a linear algorithm that arises by solving a variational problem. It produces a linear embedding that respects the local geometrical structure described by the Euclidean distances. Some illustrative examples are presented along with applications to real data sets.

论文关键词:Locality preserving,Manifold learning,Principal component analysis,Tangent space,Dimension reduction

论文评审过程:Received 26 March 2003, Accepted 29 September 2003, Available online 20 February 2004.

论文官网地址:https://doi.org/10.1016/j.patcog.2003.09.005