Unified and Simple Sample Size Calculations for Individual or Cluster Randomized Trials with Skewed or Ordinal Outcomes
Abstract
Sample size calculations can be challenging with skewed continuous outcomes in randomized controlled trials (RCTs).
Standard t-test-based calculations may require data transformation, which may be difficult before data collection.
Calculations based on individual and clustered Wilcoxon rank-sum tests have been proposed as alternatives, but these calculations for clustered data assume no ties in continuous outcomes, and clustered Wilcoxon rank-sum tests perform poorly with heterogeneous cluster sizes.
Recent work has shown that continuous outcomes can be robustly analyzed using ordinal cumulative probability models.
Analogously, sample size calculations for ordinal outcomes can be a robust design strategy for continuous outcomes.
We show that Whitehead sample size calculations for independent ordinal outcomes can naturally extend to continuous outcomes.
We extend these calculations to cluster RCTs using a design effect incorporating rank intraclass correlation coefficients.
Therefore, we provide a unifying, simple approach for designing individual and cluster RCTs for continuous or ordinal outcomes that makes minimal assumptions on the distribution of the still-to-be-collected outcome.
We conduct simulations to evaluate our approach performance and illustrate its application in multiple RCTs: an individual RCT with skewed continuous outcomes, a cluster RCT with skewed continuous outcomes, and a non-inferiority cluster RCT with an irregularly distributed count outcome.
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