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Main Authors: Yang, Chengxin, Liu, Bo, Li, Fan
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2605.10088
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author Yang, Chengxin
Liu, Bo
Li, Fan
author_facet Yang, Chengxin
Liu, Bo
Li, Fan
contents This paper develops power and sample size formulas for causal inference with time-to-event outcomes. The target estimand is the marginal hazard ratio: the coefficient of a marginal structural Cox proportional hazard model with treatment as the only predictor. We extend the robust sandwich variance theory and derive the analytical form of the asymptotic variance for the inverse probability weighted partial likelihood estimator. Building on this, we derive a new analytical sample size formula valid at any prespecified effect size, applicable to both randomized trials and observational studies. For randomized trials, the formula requires only the canonical inputs of treatment proportion, effect size, and event rate. The new formula corrects the mischaracterization of classic log-rank-based formulas. For observational studies, one additional input suffices: an overlap coefficient summarizing covariate similarity between comparison groups. We further develop a variance inflation approach applicable to any propensity score balancing weights, anchored to the corrected baseline variance. We provide an online calculator and an R package 'PSpower' to implement the method.
format Preprint
id arxiv_https___arxiv_org_abs_2605_10088
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Sample size and power calculations for causal inference with time-to-event outcomes
Yang, Chengxin
Liu, Bo
Li, Fan
Methodology
This paper develops power and sample size formulas for causal inference with time-to-event outcomes. The target estimand is the marginal hazard ratio: the coefficient of a marginal structural Cox proportional hazard model with treatment as the only predictor. We extend the robust sandwich variance theory and derive the analytical form of the asymptotic variance for the inverse probability weighted partial likelihood estimator. Building on this, we derive a new analytical sample size formula valid at any prespecified effect size, applicable to both randomized trials and observational studies. For randomized trials, the formula requires only the canonical inputs of treatment proportion, effect size, and event rate. The new formula corrects the mischaracterization of classic log-rank-based formulas. For observational studies, one additional input suffices: an overlap coefficient summarizing covariate similarity between comparison groups. We further develop a variance inflation approach applicable to any propensity score balancing weights, anchored to the corrected baseline variance. We provide an online calculator and an R package 'PSpower' to implement the method.
title Sample size and power calculations for causal inference with time-to-event outcomes
topic Methodology
url https://arxiv.org/abs/2605.10088