Abstract
Drug combination trials are often motivated by the fact that individual drugs target the same disease but via different routes. A combination of such drugs may then have an overall better effect than the individual treatments which has to be verified by clinical trials. Several statistical methods have been explored that discuss the problem of comparing a fixed-dose combination therapy to each of its components. But an extension of these approaches to multiple dose combinations can be difficult and is not yet fully investigated. In this paper, we propose two approaches by which one can provide confirmatory assurance with familywise error rate control, that the combination of two drugs at differing doses is more effective than either component doses alone. These approaches involve multiple comparisons in multilevel factorial designs where the type 1 error can be controlled first, by bootstrapping tests, and second, by considering the least favorable null configurations for a family of union intersection tests. The main advantage of the new approaches is that their implementation is simple. The implementation of these new approaches is illustrated with a real data example from a blood pressure reduction trial. Extensive simulations are also conducted to evaluate the new approaches and benchmark them with existing ones. We also present an illustration of the relationship between the different approaches. We observed that the bootstrap provided some power advantages over the other approaches with the disadvantage that there may be some error rate inflation for small sample sizes.
Highlights
Combining different drugs is an important treatment option in many therapeutic areas such as respiratory, cardiovascular disease, cancer or infectious diseases
The primary questions that often arise in a drug combination therapy trial are: [1] Does there exist a dose combination that shows a better effect than the placebo control? [2] Does there exist a dose combination that is superior to the individual treatments, where the individual treatments are often termed as monotherapies? [3] What are the specific combinations that fulfill both effectiveness and superiority?
The least favorable configurations (LFC) approach identifies the same configurations as the extreme parameter configurations of the parameter dij introduced by Hung.7. Under these extreme configurations using multiple testing theory, we show that the LFC leads to a multivariate t distribution for the test statistics T in equation [4] under the null H0 in equation [3]
Summary
Combining different drugs is an important treatment option in many therapeutic areas such as respiratory, cardiovascular disease, cancer or infectious diseases. The primary questions that often arise in a drug combination therapy trial are: [1] Does there exist a dose combination that shows a better effect than the placebo control (effectiveness)? Laska and Meisner and Snapinn are the first to consider the problem of testing the superiority of a certain combination treatment over the component treatments in a single dose combination setting. They conducted a ‘‘min-test’’, where the minimum of the test statistics comparing the combination treatment with the monotherapies are used to show that the combination treatment is better.
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