Abstract
A seminal result in the ICA literature states that for , if the components of ε are independent and at most one is Gaussian, then A is identified up to sign and permutation of its rows (Signal Process. 36 (1994)). In this paper we study to which extent the independence assumption can be relaxed by replacing it with restrictions on higher order moment or cumulant tensors of ε. We document new conditions that establish identification for several nonindependent component models, for example, common variance models, and propose efficient estimation methods based on the identification results. We show that in situations where independence cannot be assumed the efficiency gains can be significant relative to methods that rely on independence.
Funding Statement
Mesters acknowledges financial support from the Severo Ochoa Programme for Centres of Excellence in R&D (Barcelona School of Economics CEX2019-000915-S), funded by MCIN/AEI/10.13039/50110001103 and the 2021 ERC Starting Grant POLICYMETRICS. Zwiernik was supported by NSERC grant RGPIN-2023-03481.
Version Information
The current version of this article supersedes the original publication version posted on 18 December 2024. The title of the paper has been changed from Nonndependent components analysis to Non-independent component analysis. The Acknowledgement Section has been updated with additional affiliations for the authors. Also a Funding section has been added to the paper.
Acknowledgements
We would like to thank Joe Kileel, Mateusz Michałek, Mikkel Plagborg-Møller and Anna Seigal for helpful remarks. Geert Mesters is also affiliated with Barcelona School of Economics and CREI. Piotr Zwiernik is also affiliated with the Department of Economics and Business, Universitat Pompeu Fabra and Barcelona School of Economics.
Citation
Geert Mesters. Piotr Zwiernik. "Non-independent component analysis." Ann. Statist. 52 (6) 2506 - 2528, December 2024. https://doi.org/10.1214/24-AOS2373
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