Input space regularization stabilizes pre-images for kernel PCA de-noising

Solution of the pre-image problem is key to efficient non-linear de-noising using kernel Principal Component Analysis. Pre-image estimation is inherently ill-posed for typical kernels used in applications and consequently the most widely used estimation schemes lack stability. For de-noising applications we propose input space distance regularization as a stabilizer for pre-image estimation. We perform extensive experiments on the USPS digit modeling problem to evaluate the stability of three widely used pre-image estimators. We show that the previous methods lack stability when the feature mapping is non-linear, however, by applying a simple input space distance regularizer we can reduce variability with very limited sacrifice in terms of de-noising efficiency.

[1]  Allen Tannenbaum,et al.  Statistical shape analysis using kernel PCA , 2006, Electronic Imaging.

[2]  Bernhard Schölkopf,et al.  Learning to Find Pre-Images , 2003, NIPS.

[3]  Bernhard Schölkopf,et al.  Iterative kernel principal component analysis for image modeling , 2005, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[4]  Fernando De la Torre,et al.  Robust Kernel Principal Component Analysis , 2008, NIPS.

[5]  Jian-Huang Lai,et al.  Regularized Locality Preserving Learning of Pre-Image Problem in Kernel Principal Component Analysis , 2006, 18th International Conference on Pattern Recognition (ICPR'06).

[6]  Jonathan J. Hull,et al.  A Database for Handwritten Text Recognition Research , 1994, IEEE Trans. Pattern Anal. Mach. Intell..

[7]  Bernhard Schölkopf,et al.  Nonlinear Component Analysis as a Kernel Eigenvalue Problem , 1998, Neural Computation.

[8]  Sebastian Mika,et al.  Kernel peA and DeNoising in Feature Spaces , 1998 .

[9]  Gunnar Rätsch,et al.  Input space versus feature space in kernel-based methods , 1999, IEEE Trans. Neural Networks.

[10]  Kurt Stadlthanner,et al.  KPCA denoising and the pre-image problem revisited , 2008, Digit. Signal Process..

[11]  Takio Kurita,et al.  Robust De-noising by Kernel PCA , 2002, ICANN.

[12]  Ivor W. Tsang,et al.  The pre-image problem in kernel methods , 2003, IEEE Transactions on Neural Networks.

[13]  Bernhard Schölkopf,et al.  Fast Approximation of Support Vector Kernel Expansions, and an Interpretation of Clustering as Approximation in Feature Spaces , 1998, DAGM-Symposium.

[14]  Guillermo Sapiro,et al.  Connecting the Out-of-Sample and Pre-Image Problems in Kernel Methods , 2007, 2007 IEEE Conference on Computer Vision and Pattern Recognition.