October 2023 Nonparametric conditional local independence testing
Alexander Mangulad Christgau, Lasse Petersen, Niels Richard Hansen
Author Affiliations +
Ann. Statist. 51(5): 2116-2144 (October 2023). DOI: 10.1214/23-AOS2323

Abstract

Conditional local independence is an asymmetric independence relation among continuous time stochastic processes. It describes whether the evolution of one process is directly influenced by another process given the histories of additional processes, and it is important for the description and learning of causal relations among processes. We develop a model-free framework for testing the hypothesis that a counting process is conditionally locally independent of another process. To this end, we introduce a new functional parameter called the Local Covariance Measure (LCM), which quantifies deviations from the hypothesis. Following the principles of double machine learning, we propose an estimator of the LCM and a test of the hypothesis using nonparametric estimators and sample splitting or cross-fitting. We call this test the (cross-fitted) Local Covariance Test ((X)-LCT), and we show that its level and power can be controlled uniformly, provided that the nonparametric estimators are consistent with modest rates. We illustrate the theory by an example based on a marginalized Cox model with time-dependent covariates, and we show in simulations that when double machine learning is used in combination with cross-fitting, then the test works well without restrictive parametric assumptions.

Funding Statement

The work was supported by Novo Nordisk Foundation Grant NNF20OC0062897.

Acknowledgments

The authors would like to thank the Associate Editor and the anonymous reviewers for constructive comments that lead to substantial improvements of the paper.

Citation

Download Citation

Alexander Mangulad Christgau. Lasse Petersen. Niels Richard Hansen. "Nonparametric conditional local independence testing." Ann. Statist. 51 (5) 2116 - 2144, October 2023. https://doi.org/10.1214/23-AOS2323

Information

Received: 1 April 2022; Revised: 1 August 2023; Published: October 2023
First available in Project Euclid: 14 December 2023

Digital Object Identifier: 10.1214/23-AOS2323

Subjects:
Primary: 62G10
Secondary: 62G20

Keywords: Double machine learning , functional CLT , local independence , nonparametric inference , Stochastic processes

Rights: Copyright © 2023 Institute of Mathematical Statistics

Vol.51 • No. 5 • October 2023
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