PCM Selector: Penalized Covariate-Mediator Selection Operator for Evaluating Linear Causal Effects
Abstract
For a data-generating process for random variables that can be described with a linear structural equation model, we consider a situation in which (i) a set of covariates satisfying the back-door criterion cannot be observed or (ii) such a set can be observed, but standard statistical estimation methods cannot be applied to estimate causal effects because of multicollinearity/high-dimensional data problems. We propose a novel two-stage penalized regression approach, the penalized covariate-mediator selection operator (PCM Selector), to estimate the causal effects in such scenarios. Unlike existing penalized regression analyses, when a set of intermediate variables is available, PCM Selector provides a consistent or less biased estimator of the causal effect. In addition, PCM Selector provides a variable selection procedure for intermediate variables to obtain better estimation accuracy of the causal effects than does the back-door criterion.
Cite
Text
Nanmo and Kuroki. "PCM Selector: Penalized Covariate-Mediator Selection Operator for Evaluating Linear Causal Effects." AAAI Conference on Artificial Intelligence, 2025. doi:10.1609/AAAI.V39I25.34889Markdown
[Nanmo and Kuroki. "PCM Selector: Penalized Covariate-Mediator Selection Operator for Evaluating Linear Causal Effects." AAAI Conference on Artificial Intelligence, 2025.](https://mlanthology.org/aaai/2025/nanmo2025aaai-pcm/) doi:10.1609/AAAI.V39I25.34889BibTeX
@inproceedings{nanmo2025aaai-pcm,
title = {{PCM Selector: Penalized Covariate-Mediator Selection Operator for Evaluating Linear Causal Effects}},
author = {Nanmo, Hisayoshi and Kuroki, Manabu},
booktitle = {AAAI Conference on Artificial Intelligence},
year = {2025},
pages = {26851-26858},
doi = {10.1609/AAAI.V39I25.34889},
url = {https://mlanthology.org/aaai/2025/nanmo2025aaai-pcm/}
}