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On order determination by predictor augmentation

Wei Luo, Bing Li

2020Biometrika25 citationsDOI

Abstract

Summary In many dimension reduction problems in statistics and machine learning, such as in principal component analysis, canonical correlation analysis, independent component analysis and sufficient dimension reduction, it is important to determine the dimension of the reduced predictor, which often amounts to estimating the rank of a matrix. This problem is called order determination. In this article, we propose a novel and highly effective order-determination method based on the idea of predictor augmentation. We show that if the predictor is augmented by an artificially generated random vector, then the parts of the eigenvectors of the matrix induced by the augmentation display a pattern that reveals information about the order to be determined. This information, when combined with the information provided by the eigenvalues of the matrix, greatly enhances the accuracy of order determination.

Topics & Concepts

Principal component analysisMathematicsDimensionality reductionEigenvalues and eigenvectorsDimension (graph theory)Rank (graph theory)Canonical correlationMatrix (chemical analysis)Reduction (mathematics)Component analysisOrder (exchange)Sparse PCASufficient dimension reductionStatisticsApplied mathematicsAlgorithmPattern recognition (psychology)Artificial intelligenceCombinatoricsComputer scienceRegressionFinanceGeometryEconomicsComposite materialQuantum mechanicsMaterials sciencePhysicsBlind Source Separation TechniquesFace and Expression RecognitionNeural Networks and Applications
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