Title of article
A prior-free framework of coherent inference and its derivation of simple shrinkage estimators
Author/Authors
Bickel، نويسنده , , David R. and Padilla، نويسنده , , Marta، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2014
Pages
18
From page
204
To page
221
Abstract
The reasoning behind uses of confidence intervals and p-values in scientific practice may be made coherent by modeling the inferring statistician or scientist as an idealized intelligent agent. With other things equal, such an agent regards a hypothesis coinciding with a confidence interval of a higher confidence level as more certain than a hypothesis coinciding with a confidence interval of a lower confidence level. The agent uses different methods of confidence intervals conditional on what information is available. The coherence requirement means that all levels of certainty of hypotheses about the parameter agree with the same distribution of certainty over parameter space. The result is a unique and coherent fiducial distribution that encodes the post-data certainty levels of the agent.
many coherent fiducial distributions coincide with confidence distributions or Bayesian posterior distributions, there is a general class of coherent fiducial distributions that equates the two-sided p-value with the probability that the null hypothesis is true. The use of that class leads to point estimators and interval estimators that can be derived neither from the dominant frequentist theory nor from Bayesian theories that rule out data-dependent priors. These simple estimators shrink toward the parameter value of the null hypothesis without relying on asymptotics or on prior distributions.
Keywords
Confidence distribution , Confidence curve , Confidence measure , Fiducial inference , Fiducial shrinkage , Observed confidence level , Confidence posterior distribution
Journal title
Journal of Statistical Planning and Inference
Serial Year
2014
Journal title
Journal of Statistical Planning and Inference
Record number
2222553
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