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Research Report SRR95-045
Covariate matched one sided tests for the difference between functional means
Peter Hall, Catherine Huber and Paul L. Speckman
Abstract:
When testing hypotheses about the effects of
different treatments, variation among covariates can become confounded with
that between treatments unless the treatments are applied using paired covariates. In the context of unpaired covariates we propose implicit
covariate-matching methods for testing the hypothesis that one treatment
effect is greater than another. The methods are founded on the assumption
that the mean treatment effect, conditional on the covariate, is a smooth
function of the covariate. They are implemented using new interpolation
techniques for nonparametric curve estimation. Bootstrap arguments are
employed to construct critical points. We show that, even when the covariate
distributions are identical for both treatments, covariate matching of the
type that we propose produces tests of greater power than do methods which do
not attempt matching. Our techniques have application to two-sided hypothesis
testing.
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