DEBIASED INVERSE-VARIANCE WEIGHTED ESTIMATOR IN TWO-SAMPLE SUMMARY-DATA MENDELIAN RANDOMIZATION
成果类型:
Article
署名作者:
Ye, Ting; Shao, Jun; Kang, Hyunseung
署名单位:
University of Pennsylvania; East China Normal University; University of Wisconsin System; University of Wisconsin Madison
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/20-AOS2027
发表日期:
2021
页码:
2079-2100
关键词:
genome-wide association
weak instruments
CONSISTENT ESTIMATION
BIAS
identification
pleiotropy
variables
robust
RISK
rare
摘要:
Mendelian randomization (MR) has become a popular approach to study the effect of a modifiable exposure on an outcome by using genetic variants as instrumental variables. A challenge in MR is that each genetic variant explains a relatively small proportion of variance in the exposure and there are many such variants, a setting known as many weak instruments. To this end, we provide a theoretical characterization of the statistical properties of two popular estimators in MR: the inverse-variance weighted (IVW) estimator and the IVW estimator with screened instruments using an independent selection dataset, under many weak instruments. We then propose a debiased IVW estimator, a simple modification of the IVW estimator, that is robust to many weak instruments and does not require screening. Additionally, we present two instrument selection methods to improve the efficiency of the new estimator when a selection dataset is available. An extension of the debiased IVW estimator to handle balanced horizontal pleiotropy is also discussed. We conclude by demonstrating our results in simulated and real datasets.