The variance of causal effect estimators for binary v-structures
Abstract Adjusting for covariates is a well-established method to estimate the total causal effect of an exposure variable on an outcome of interest. Depending on the causal structure of the mechanism under study, there may be different adjustment sets, equally valid from a theoretical perspective, leading to identical causal effects. However, in practice, with finite data, estimators built on different sets may display different precisions. To investigate the extent of this variability, we consider the simplest non-trivial non-linear model of a v-structure on three nodes for binary data. We explicitly compute and compare the variance of the two possible different causal estimators. Further, by going beyond leading-order asymptotics, we show that there are parameter regimes where the set with the asymptotically optimal variance does depend on the edge coefficients, a result that is not captured by the recent leading-order developments for general causal models. As a practical consequence, the adjustment set selection needs to account for the relative magnitude of the relationships between variables with respect to the sample size and cannot rely on purely graphical criteria.
Year of publication: |
2022
|
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Authors: | Kuipers, Jack ; Moffa, Giusi |
Published in: |
Journal of Causal Inference. - De Gruyter, ISSN 2193-3685, ZDB-ID 2742570-8. - Vol. 10.2022, 1, p. 90-105
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Publisher: |
De Gruyter |
Subject: | causality | covariate adjustment | structure learning | Bayesian networks | probability theory |
Saved in:
freely available
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