Title :
Kernel Neighborhood Preserving Embedding and its Essence Analysis
Author :
Tao, Xiaoyan ; Dong, Shufu ; Zhao, Qiaoxia ; Han, Zhongxiang
Author_Institution :
Telecommun. Eng. Inst., Air Force Eng. Univ., Xi´´an, China
Abstract :
A new dimensionality reduction method, neighborhood preserving embedding (NPE) is recently proposed which offers a linear yet powerful method to preserve the local neighborhood structure on the data manifold. However, it is confined to linear transforms in the data space. For this, kernel NPE (KNPE) is presented, which preserves the local neighborhood structure in the higher-dimension feature space. To avoid computing the inverse matrix of the positive semi-definite kernel matrix, a transformed optimization problem and QR decomposition are used. Then the analysis on KNPE reveals that KNPE is equivalent to kernel principal component analysis (KPCA) plus NPE. The experimental results on the real-world data sets illustrate the effectiveness of the new algorithm.
Keywords :
data handling; principal component analysis; transforms; KNPE; QR decomposition; dimensionality reduction method; essence analysis; kernel neighborhood preserving embedding; kernel principal component analysis; linear transform; local neighborhood structure; positive semidefinite kernel matrix; transformed optimization problem; Data engineering; Intelligent structures; Intelligent systems; Kernel; Linear approximation; Linear discriminant analysis; Manifolds; Matrix decomposition; Power engineering and energy; Principal component analysis; QR decomposition; kernel NPE; manifold learning;
Conference_Titel :
Intelligent Systems, 2009. GCIS '09. WRI Global Congress on
Conference_Location :
Xiamen
Print_ISBN :
978-0-7695-3571-5
DOI :
10.1109/GCIS.2009.462
