Journal
MATHEMATICS
Volume 11, Issue 18, Pages -Publisher
MDPI
DOI: 10.3390/math11183849
Keywords
three-sample problem; homogeneity test; Bernstein-von Mises theorem; posterior p-value
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In this paper, a special kind of finite mixture model is studied, and the hypothesis of whether two density functions are the same is tested using a posterior p-value approach. Simulation studies and analysis on a real dataset demonstrate the effectiveness and control of Type-I error of the proposed method.
In this paper, we study a special kind of finite mixture model. The sample drawn from the model consists of three parts. The first two parts are drawn from specified density functions, f(1) and f(2), while the third one is drawn from the mixture. A problem of interest is whether the two functions, f(1) and f(2), are the same. To test this hypothesis, we first define the regular location and scale family of distributions and assume that f1 and f(2) are regular density functions. Then the hypothesis transforms to the equalities of the location and scale parameters, respectively. To utilize the information in the sample, we use Bayes' theorem to obtain the posterior distribution and give the sampling method. We then propose the posterior p-value to test the hypothesis. The simulation studies show that our posterior p-value largely improves the power in both normal and logistic cases and nicely controls the Type-I error. A real halibut dataset is used to illustrate the validity of our method.
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