Extension of two-sided test to multiple treatment trials |
| |
Authors: | T. Timothy Chen Richard Simon |
| |
Affiliation: | Biometric Research Branch , National Cancer Institute , Bethesda, Maryland, 20892EPN-739 |
| |
Abstract: | In a two-treatment trial, a two-sided test is often used to reach a conclusion, Usually we are interested in doing a two-sided test because of no prior preference between the two treatments and we want a three-decision framework. When a standard control is just as good as the new experimental treatment (which has the same toxicity and cost), then we will accept both treatments. Only when the standard control is clearly worse or better than the new experimental treatment, then we choose only one treatment. In this paper, we extend the concept of a two-sided test to the multiple treatment trial where three or more treatments are involved. The procedure turns out to be a subset selection procedure; however, the theoretical framework and performance requirement are different from the existing subset selection procedures. Two procedures (exclusion or inclusion) are developed here for the case of normal data with equal known variance. If the sample size is large, they can be applied with unknown variance and with the binomial data or survival data with random censoring. |
| |
Keywords: | multiple comparison multiple range test sample size subset selection slippage test |
|
|