Abstract:
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In multiple imputation (MI), the total variance (T) is estimated by U+(1+1/m)B, where U is the within-imputation variance, B the between-imputation variance, and m the number of imputations. The expected value of U is not affected by a proper MI, whereas the extra variance B can be captured only by MI but not by single imputation (SI). Whether B is large enough to cause a meaningful change in T may have an effect on people's perspective towards the value of MI as compared to SI. This paper evaluates how data analysis affects the impact of MI (IMI), measured as IMI = 100(B/T)1/2. MI trials were conducted using the data of the 2012 Physician Workflow Mail Survey. Difference in analytic models had differentiated effects on B and U. Our results suggest that, for the same MI and the same data, IMI may be negligible (<1%) in one analysis but substantial (>5%) in another.
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