BREAKING THE WINNER?S CURSE IN MENDELIAN RANDOMIZATION: RERANDOMIZED INVERSE VARIANCE WEIGHTED ESTIMATOR

Article

Ma, Xinwei; Wang, Jingshen; Wu, Chong

University of California System; University of California San Diego; University of California System; University of California Berkeley; University of Texas System; UTMD Anderson Cancer Center

ANNALS OF STATISTICS

0090-5364

10.1214/22-AOS2247

2023

211-232

Developments in genome-wide association studies and the increasing availability of summary genetic association data have made the application of two-sample Mendelian Randomization (MR) with summary data increas-ingly popular. Conventional two-sample MR methods often employ the same sample for selecting relevant genetic variants and for constructing final causal estimates. Such a practice often leads to biased causal effect estimates due to the well-known ???winner???s curse??? phenomenon. To address this fundamen-tal challenge, we first examine its consequence on causal effect estimation both theoretically and empirically. We then propose a novel framework that systematically breaks the winner???s curse, leading to unbiased association ef-fect estimates for the selected genetic variants. Building upon the proposed framework, we introduce a novel rerandomized inverse variance weighted estimator that is consistent when selection and parameter estimation are con-ducted on the same sample. Under appropriate conditions, we show that the proposed RIVW estimator for the causal effect converges to a normal distri-bution asymptotically and its variance can be well estimated. We illustrate the finite-sample performance of our approach through Monte Carlo experiments and two empirical examples.