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Literature DB >> 30549000

Drawing inferences for high-dimensional linear models: A selection-assisted partial regression and smoothing approach.

Zhe Fei¹, Ji Zhu², Moulinath Banerjee², Yi Li¹.

Abstract

Drawing inferences for high-dimensional models is challenging as regular asymptotic theories are not applicable. This article proposes a new framework of simultaneous estimation and inferences for high-dimensional linear models. By smoothing over partial regression estimates based on a given variable selection scheme, we reduce the problem to low-dimensional least squares estimations. The procedure, termed as Selection-assisted Partial Regression and Smoothing (SPARES), utilizes data splitting along with variable selection and partial regression. We show that the SPARES estimator is asymptotically unbiased and normal, and derive its variance via a nonparametric delta method. The utility of the procedure is evaluated under various simulation scenarios and via comparisons with the de-biased LASSO estimators, a major competitor. We apply the method to analyze two genomic datasets and obtain biologically meaningful results.

Entities: Chemical Disease Gene Species

Keywords: Selection-assisted Partial Regression and Smoothing (SPARES); confidence intervals; high-dimensional inference; hypothesis testing; multisample-splitting

Mesh：

Year: 2019 PMID： 30549000 PMCID： PMC6570588 DOI： 10.1111/biom.13013

Source DB: PubMed Journal: Biometrics ISSN： 0006-341X Impact factor: 2.571

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