Sample size determination for case-control studies and the comparison of stratified and unstratified analyses.

Woolson, Bean, and Rojas (1986, Biometrics 42, 927-932) present a simple approximation of sample size for Cochran's (1954, Biometrics 10, 417-451) test for detecting association between exposure and disease. It is useful in the design of case-control studies. We derive a sample size formula for Cochran's statistic with continuity correction which guarantees that the actual Type I error rate of the test does not exceed the nominal level. The corrected sample size is necessarily larger than the uncorrected one given by Woolson et al. and the relative difference between the two sample sizes is considerable. Allocation of equal number of cases and controls within each stratum is asymptotically optimal when the costs per case and control are the same. When any effect of stratification is absent, Cochran's stratified test, although valid, is less efficient than the unstratified one except for the important case of a balanced design.

[1]  Bernard Rosner,et al.  Power and Sample Size for a Collection of 2 x 2 Tables , 1984 .

[2]  M. Gail The determination of sample sizes for trials involving several independent 2x2 tables. , 1973, Journal of chronic diseases.

[3]  M. Pike,et al.  An improved approximate formula for calculating sample sizes for comparing two binomial distributions. , 1978, Biometrics.

[4]  A. Stuart Asymptotic Relative Efficiencies of Distribution-Free Tests of Randomness Against Normal Alternatives , 1954 .

[5]  J. Gart Pooling 2 Times 2 Tables: Asymptotic Moments of Estimators , 1992 .

[6]  On the accuracy of a normal approximation to the power of the mantel-haenszel procedure , 1982 .

[7]  Optimum allocation of samples in strata-matching case-control studies when cost per sample differs from stratum to stratum. , 1990, Statistics in medicine.

[8]  J. Fleiss,et al.  A simple approximation for calculating sample sizes for comparing independent proportions. , 1980, Biometrics.

[9]  J M Nam,et al.  A simple approximation for calculating sample sizes for detecting linear trend in proportions. , 1987, Biometrics.

[10]  R F Woolson,et al.  Sample size for case-control studies using Cochran's statistic. , 1986, Biometrics.

[11]  M. W. Birch The Detection of Partial Association, I: The 2 × 2 Case , 1964 .

[12]  Sylvan Wallenstein,et al.  The Power of the Mantel—Haenszel Test , 1987 .

[13]  W. G. Cochran Some Methods for Strengthening the Common χ 2 Tests , 1954 .

[14]  W. Haenszel,et al.  Statistical aspects of the analysis of data from retrospective studies of disease. , 1959, Journal of the National Cancer Institute.

[15]  S. Radhakrishna,et al.  Combination of results from several 2 X 2 contingency tables , 1965 .