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Envelope-based sparse partial least squares

Guangyu Zhu, Zhihua Su

2020The Annals of Statistics38 citationsDOIOpen Access PDF

Abstract

Sparse partial least squares (SPLS) is widely used in applied sciences as a method that performs dimension reduction and variable selection simultaneously in linear regression. Several implementations of SPLS have been derived, among which the SPLS proposed in Chun and Keleş (J. R. Stat. Soc. Ser. B. Stat. Methodol. 72 (2010) 3–25) is very popular and highly cited. However, for all of these implementations, the theoretical properties of SPLS are largely unknown. In this paper, we propose a new version of SPLS, called the envelope-based SPLS, using a connection between envelope models and partial least squares (PLS). We establish the consistency, oracle property and asymptotic normality of the envelope-based SPLS estimator. The large-sample scenario and high-dimensional scenario are both considered. We also develop the envelope-based SPLS estimators under the context of generalized linear models, and discuss its theoretical properties including consistency, oracle property and asymptotic distribution. Numerical experiments and examples show that the envelope-based SPLS estimator has better variable selection and prediction performance over the SPLS estimator (J. R. Stat. Soc. Ser. B. Stat. Methodol. 72 (2010) 3–25).

Topics & Concepts

EstimatorEnvelope (radar)MathematicsOracleContext (archaeology)Consistency (knowledge bases)AlgorithmAsymptotic distributionDimension (graph theory)Applied mathematicsMathematical optimizationComputer scienceStatisticsDiscrete mathematicsBiologyPaleontologyPure mathematicsRadarSoftware engineeringTelecommunicationsBlind Source Separation TechniquesSparse and Compressive Sensing TechniquesImage and Signal Denoising Methods
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