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May 2014 On the Birnbaum Argument for the Strong Likelihood Principle
Deborah G. Mayo
Statist. Sci. 29(2): 227-239 (May 2014). DOI: 10.1214/13-STS457

Abstract

An essential component of inference based on familiar frequentist notions, such as $p$-values, significance and confidence levels, is the relevant sampling distribution. This feature results in violations of a principle known as the strong likelihood principle (SLP), the focus of this paper. In particular, if outcomes $\mathbf{x}^{\ast }$ and $\mathbf{y}^{\ast }$ from experiments $E_{1}$ and $E_{2}$ (both with unknown parameter $\theta $) have different probability models $f_{1}(\cdot)$, $f_{2}(\cdot)$, then even though $f_{1}(\mathbf{x}^{\ast };\theta )=cf_{2}(\mathbf{y}^{\ast };\theta )$ for all $\theta $, outcomes $\mathbf{x}^{\ast }$ and $\mathbf{y}^{\ast }$ may have different implications for an inference about $\theta $. Although such violations stem from considering outcomes other than the one observed, we argue this does not require us to consider experiments other than the one performed to produce the data. David Cox [Ann. Math. Statist. 29 (1958) 357–372] proposes the Weak Conditionality Principle (WCP) to justify restricting the space of relevant repetitions. The WCP says that once it is known which $E_{i}$ produced the measurement, the assessment should be in terms of the properties of $E_{i}$. The surprising upshot of Allan Birnbaum’s [J. Amer. Statist. Assoc. 57 (1962) 269–306] argument is that the SLP appears to follow from applying the WCP in the case of mixtures, and so uncontroversial a principle as sufficiency (SP). But this would preclude the use of sampling distributions. The goal of this article is to provide a new clarification and critique of Birnbaum’s argument. Although his argument purports that [(WCP and SP) entails SLP], we show how data may violate the SLP while holding both the WCP and SP. Such cases also refute [WCP entails SLP].

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Deborah G. Mayo. "On the Birnbaum Argument for the Strong Likelihood Principle." Statist. Sci. 29 (2) 227 - 239, May 2014. https://doi.org/10.1214/13-STS457

Information

Published: May 2014
First available in Project Euclid: 18 August 2014

zbMATH: 1332.62025
MathSciNet: MR3264534
Digital Object Identifier: 10.1214/13-STS457

Rights: Copyright © 2014 Institute of Mathematical Statistics

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Vol.29 • No. 2 • May 2014
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