Cookies?
Library Header Image
LSE Research Online LSE Library Services

Rotation to sparse loadings using Lp losses and related inference problems

Liu, Xinyi Lin, Wallin, Gabriel, Chen, Yunxiao ORCID: 0000-0002-7215-2324 and Moustaki, Irini ORCID: 0000-0001-8371-1251 (2023) Rotation to sparse loadings using Lp losses and related inference problems. Psychometrika, 88 (2). pp. 527-553. ISSN 0033-3123

[img] Text (s11336-023-09911-y) - Published Version
Available under License Creative Commons Attribution.

Download (723kB)

Identification Number: 10.1007/s11336-023-09911-y

Abstract

Researchers have widely used exploratory factor analysis (EFA) to learn the latent structure underlying multivariate data. Rotation and regularised estimation are two classes of methods in EFA that they often use to find interpretable loading matrices. In this paper, we propose a new family of oblique rotations based on component-wise L p loss functions (0 < p≤ 1) that is closely related to an L p regularised estimator. We develop model selection and post-selection inference procedures based on the proposed rotation method. When the true loading matrix is sparse, the proposed method tends to outperform traditional rotation and regularised estimation methods in terms of statistical accuracy and computational cost. Since the proposed loss functions are nonsmooth, we develop an iteratively reweighted gradient projection algorithm for solving the optimisation problem. We also develop theoretical results that establish the statistical consistency of the estimation, model selection, and post-selection inference. We evaluate the proposed method and compare it with regularised estimation and traditional rotation methods via simulation studies. We further illustrate it using an application to the Big Five personality assessment.

Item Type: Article
Additional Information: © 2023. The Author(s).
Divisions: Statistics
Subjects: H Social Sciences > HA Statistics
Date Deposited: 06 Mar 2023 15:06
Last Modified: 18 Nov 2024 18:09
URI: http://eprints.lse.ac.uk/id/eprint/118349

Actions (login required)

View Item View Item

Downloads

Downloads per month over past year

View more statistics