Title :
Graph-Laplacian PCA: Closed-Form Solution and Robustness
Author :
Bo Jiang ; Ding, Chibiao ; Bio Luo ; Jin Tang
Author_Institution :
Sch. of Comput. Sci. & Technol., Anhui Univ., Hefei, China
Abstract :
Principal Component Analysis (PCA) is a widely used to learn a low-dimensional representation. In many applications, both vector data X and graph data W are available. Laplacian embedding is widely used for embedding graph data. We propose a graph-Laplacian PCA (gLPCA) to learn a low dimensional representation of X that incorporates graph structures encoded in W. This model has several advantages: (1) It is a data representation model. (2) It has a compact closed-form solution and can be efficiently computed. (3) It is capable to remove corruptions. Extensive experiments on 8 datasets show promising results on image reconstruction and significant improvement on clustering and classification.
Keywords :
data structures; graph theory; image classification; image reconstruction; pattern clustering; principal component analysis; Laplacian embedding; classification; closed-form solution; clustering; data representation model; gLPCA; graph data embedding; graph structures; graph-Laplacian PCA; image reconstruction; low-dimensional representation; principal component analysis; robustness; vector data; Computational modeling; Eigenvalues and eigenfunctions; Image reconstruction; Laplace equations; Manifolds; Principal component analysis; Vectors; Laplacian; PCA; graph; robustness;
Conference_Titel :
Computer Vision and Pattern Recognition (CVPR), 2013 IEEE Conference on
Conference_Location :
Portland, OR
DOI :
10.1109/CVPR.2013.448
