Inference for matched tuples and fully blocked factorial designs
成果类型:
Article
署名作者:
Bai, Yuehao; Liu, Jizhou; Tabord-Meehan, Max
署名单位:
University of Southern California; University of Chicago; University of Chicago
刊物名称:
QUANTITATIVE ECONOMICS
ISSN/ISSBN:
1759-7323
DOI:
10.3982/QE2354
发表日期:
2024
页码:
279-330
关键词:
Randomized controlled trials
matched tuples
matched pairs
multiple treatments
factorial designs
C12
C14
摘要:
This paper studies inference in randomized controlled trials with multiple treatments, where treatment status is determined according to a matched tuples design. If there are |D| possible treatments, then by a matched tuples design, we mean an experimental design where units are sampled i.i.d. from the population of interest, grouped into homogeneous blocks of size |D|, and finally, within each block, exactly one individual is randomly assigned to each of the |D| treatments. We first study estimation and inference for matched tuples designs in the general setting where the parameter of interest is a vector of linear contrasts over the collection of average potential outcomes for each treatment. Parameters of this form include standard average treatment effects used to compare one treatment relative to another, but also include parameters that may be of interest in the analysis of factorial designs. We first establish conditions under which a sample analog estimator is asymptotically normal and construct a consistent estimator of its corresponding asymptotic variance. Combining these results establish the asymptotic exactness of tests based on these estimators. In contrast, we show that, for two common testing procedures based on t-tests constructed from linear regressions, one test is generally conservative while the other is generally invalid. We go on to apply our results to study the asymptotic properties of what we call fully-blocked 2K factorial designs, which are simply matched tuples designs applied to a full factorial experiment. Leveraging our previous results, we establish that our estimator achieves a lower asymptotic variance under the fully-blocked design than that under any stratified factorial design, which stratifies the experimental sample into a finite number of large strata. A simulation study and empirical application illustrate the practical relevance of our results.
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