Title :
Bilinear Probabilistic Principal Component Analysis
Author :
Jianhua Zhao ; Yu, P.L.H. ; Kwok, J.T.
Author_Institution :
Sch. of Stat. & Math., Yunnan Univ. of Finance & Econ., Kunming, China
fDate :
3/1/2012 12:00:00 AM
Abstract :
Probabilistic principal component analysis (PPCA) is a popular linear latent variable model for performing dimension reduction on 1-D data in a probabilistic manner. However, when used on 2-D data such as images, PPCA suffers from the curse of dimensionality due to the subsequently large number of model parameters. To overcome this problem, we propose in this paper a novel probabilistic model on 2-D data called bilinear PPCA (BPPCA). This allows the establishment of a closer tie between BPPCA and its nonprobabilistic counterpart. Moreover, two efficient parameter estimation algorithms for fitting BPPCA are also developed. Experiments on a number of 2-D synthetic and real-world data sets show that BPPCA is more accurate than existing probabilistic and nonprobabilistic dimension reduction methods.
Keywords :
bilinear systems; data reduction; parameter estimation; principal component analysis; probability; 1D data; 2D synthetic data set; BPPCA; bilinear PPCA; bilinear probabilistic principal component analysis; linear latent variable model; multilayer performing dimension reduction; nonprobabilistic counterpart; nonprobabilistic dimension reduction method; parameter estimation algorithm; probabilistic dimension reduction method; probabilistic model; real world data set; Covariance matrix; Data models; Loading; Maximum likelihood estimation; Noise; Principal component analysis; Probabilistic logic; 2-D data; dimension reduction; expectation maximization; principal component analysis; probabilistic model;
Journal_Title :
Neural Networks and Learning Systems, IEEE Transactions on
DOI :
10.1109/TNNLS.2012.2183006
