Limitations of clinical trial sample size estimate by subtraction of two measurements
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Final Accepted Manuscript
Author
Chen, KeweiGuo, Xiaojuan
Pan, Rong
Xiong, Chengjie
Harvey, Danielle J.
Chen, Yinghua
Yao, Li
Su, Yi
Reiman, Eric M.
Affiliation
Department of Neurology, University of ArizonaDepartment of Psychiatry, University of Arizona
Issue Date
2021-11Keywords
linear mixed effects modelrandomized clinical trial
sample size estimation
subtraction
two time point measurement
Metadata
Show full item recordPublisher
WileyCitation
Chen, K., Guo, X., Pan, R., Xiong, C., Harvey, D. J., Chen, Y., Yao, L., Su, Y., Reiman, E. M., & the Alzheimer’s Disease Neuroimaging Initiative. (2021). Limitations of clinical trial sample size estimate by subtraction of two measurements. Statistics in Medicine.Journal
Statistics in MedicineRights
© 2021 John Wiley & Sons Ltd.Collection Information
This item from the UA Faculty Publications collection is made available by the University of Arizona with support from the University of Arizona Libraries. If you have questions, please contact us at repository@u.library.arizona.edu.Abstract
In planning randomized clinical trials (RCTs) for diseases such as Alzheimer's disease (AD), researchers frequently rely on the use of existing data obtained from only two time points to estimate sample size via the subtraction of baseline from follow-up measurements in each subject. However, the inadequacy of this method has not been reported. The aim of this study is to discuss the limitation of sample size estimation based on the subtraction of available data from only two time points for RCTs. Mathematical equations are derived to demonstrate the condition under which the obtained data pairs with variable time intervals could be used to adequately estimate sample size. The MRI-based hippocampal volume measurements from the Alzheimer's Disease Neuroimaging Initiative (ADNI) and Monte Carlo simulations (MCS) were used to illustrate the existing bias and variability of estimates. MCS results support the theoretically derived condition under which the subtraction approach may work. MCS also show the systematically under- or over-estimated sample sizes by up to 32.27 (Formula presented.) bias. Not used properly, such subtraction approach outputs the same sample size regardless of trial durations partly due to the way measurement errors are handled. Estimating sample size by subtracting two measurements should be treated with caution. Such estimates can be biased, the magnitude of which depends on the planned RCT duration. To estimate sample sizes, we recommend using more than two measurements and more comprehensive approaches such as linear mixed effect models.Note
12 month embargo; first published: 01 November 2021ISSN
0277-6715EISSN
1097-0258DOI
10.1002/sim.9244Version
Final accepted manuscriptSponsors
National Institute of Mental Healthae974a485f413a2113503eed53cd6c53
10.1002/sim.9244