Binary Responses and the Three-period Cross-over

The cross-over deeign for clinical trials when responses are binary is discuseed. Three testa whicli have been proposed for the analysis of this problem are compared by an Bssessment of their Baeumptione. A simple test to cetablish whether it is appropriate to include observetione from the second pe

In clinical trials, and in bioavailability and bioequivalence studies, one often encounters replicate cross-over designs such as a two-sequence three-period cross-over design to assess treatment and carry-over effects of two formulations of a drug product. Because of the potential dropout (or for so

The paper propowe a general model for analyeizing two-period change-over deaigne with binary data. The model includes testa for carry-over effecta, treatment and period effede in analogy to the well-known ANOVA-model for oontinuoue data. Minimum modified Xtetatistice are derived and formulae for dea

Many cross-over designs with t 2 2 treatments and periods and n = bt subjects (b an integer 21) which incorporate balance for first-order carry-over effects are already known: single squares with any even value oft and some odd ones also; and sequentially balanced pairs of squares for any odd t 2 3

X nonperametric analysis for the two period cross-over design has first been suggested by KOCH (1972) and has been diecussed by HILLS and ABMITAGE (1979). As known rank teats on s u m or differenof the data are applied in this procedure, the results on the one hand am not invariant under monotonous

Pate1 analysed a two-period cross-over design with baseline measurements assuming bivariate normality for the joint distribution of the period responses. In this paper, we propose non-parametric methods for analysing this design, including the use of the Wilcoxon rank sum test to derive the prelimin