The p-value Function and Statistical Inference |
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Authors: | D. A. S. Fraser |
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Affiliation: | 1. Department of Statistical Sciences, University of Toronto, Toronto, Canadadasfraser@gmail.com |
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Abstract: | ABSTRACTThis article has two objectives. The first and narrower is to formalize the p-value function, which records all possible p-values, each corresponding to a value for whatever the scalar parameter of interest is for the problem at hand, and to show how this p-value function directly provides full inference information for any corresponding user or scientist. The p-value function provides familiar inference objects: significance levels, confidence intervals, critical values for fixed-level tests, and the power function at all values of the parameter of interest. It thus gives an immediate accurate and visual summary of inference information for the parameter of interest. We show that the p-value function of the key scalar interest parameter records the statistical position of the observed data relative to that parameter, and we then describe an accurate approximation to that p-value function which is readily constructed. |
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Keywords: | Accept–Reject Ancillarity Box–Cox Conditioning Decision or judgment Discrete data Extreme value model Fieller–Creasy Gamma mean Percentile position Power function Statistical position |
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