Title :
Approximation Kernel 2DPCA by Mixture of Vector and Matrix Representation
Author :
Wang, Lin ; Zhou, Xiuling
Author_Institution :
Network Center, Beijing City Univ., Beijing, China
Abstract :
The computational complexity of kernel 2DPCA is mainly determined by the product of the number of input image samples and rows of matrix. For the large number of this product, it is computational intractable to directly calculate the eigenvalues and eigenvectors of kernel matrix in kernel 2DPCA. In this paper, a method called M2D-PCA is proposed to approximate the Kernel 2DPCA by mixture of vector and matrix representation. The original image matrix is divided into several image blocks, each image block is transformed into a vector and a new matrix is constructed by considering these block vectors as rows. By this way the complexity of proposed kernel M2D-PCA is decreased. It is shown by experiments that the performance of one of the proposed M2D-PCA is the best among the compared methods.
Keywords :
approximation theory; computational complexity; eigenvalues and eigenfunctions; image representation; image sampling; matrix algebra; principal component analysis; vectors; approximation kernel 2DPCA; computational complexity; eigenvalues and eigenvectors; image block vector transformation; image matrix representation; image samples; kernel M2D-PCA complexity; kernel matrix rows; matrix transformation; vector representation; Complexity theory; Covariance matrix; Face; Kernel; Principal component analysis; Training; Vectors; computational complexity; kernel 2DPCA; representation component;
Conference_Titel :
Computational Intelligence and Security (CIS), 2011 Seventh International Conference on
Conference_Location :
Hainan
Print_ISBN :
978-1-4577-2008-6
DOI :
10.1109/CIS.2011.288
