Combining Variable Selection with Dimensionality Reduction

Author(s)

Wolf, Lior; Bileschi, Stanley

Additional downloads

Abstract

This paper bridges the gap between variable selection methods (e.g., Pearson coefficients, KS test) and dimensionality reductionalgorithms (e.g., PCA, LDA). Variable selection algorithms encounter difficulties dealing with highly correlated data,since many features are similar in quality. Dimensionality reduction algorithms tend to combine all variables and cannotselect a subset of significant variables.Our approach combines both methodologies by applying variable selection followed by dimensionality reduction. Thiscombination makes sense only when using the same utility function in both stages, which we do. The resulting algorithmbenefits from complex features as variable selection algorithms do, and at the same time enjoys the benefits of dimensionalityreduction.1

Date issued

2005-03-30

URI

http://hdl.handle.net/1721.1/30531

Other identifiers

MIT-CSAIL-TR-2005-019

AIM-2005-009

CBCL-247

Series/Report no.

Massachusetts Institute of Technology Computer Science and Artificial Intelligence Laboratory

Keywords

AI, Computer Vision, Statistical Learning, Variable Selection