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Invariance, Optimality, and a 1-Observation Confidence Interval for a Normal Mean

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  • Stephen Portnoy

Abstract

In a 1965 Decision Theory course at Stanford University, Charles Stein began a digression with “an amusing problem”: is there a proper confidence interval for the mean based on a single observation from a normal distribution with both mean and variance unknown? Stein introduced the interval with endpoints ± c|X| and showed indeed that for c large enough, the minimum coverage probability (over all values for the mean and variance) could be made arbitrarily near one. While the problem and coverage calculation were in the author’s hand-written notes from the course, there was no development of any optimality result for the interval. Here, the Hunt–Stein construction plus analysis based on special features of the problem provides a “minimax” rule in the sense that it minimizes the maximum expected length among all procedures with fixed coverage (or, equivalently, maximizes the minimal coverage among all procedures with a fixed expected length). The minimax rule is a mixture of two confidence procedures that are equivariant under scale and sign changes, and are uniformly better than the classroom example or the natural interval X ± c|X| .

Suggested Citation

  • Stephen Portnoy, 2019. "Invariance, Optimality, and a 1-Observation Confidence Interval for a Normal Mean," The American Statistician, Taylor & Francis Journals, vol. 73(1), pages 10-15, January.
  • Handle: RePEc:taf:amstat:v:73:y:2019:i:1:p:10-15
    DOI: 10.1080/00031305.2017.1360796
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    Cited by:

    1. Albert Vexler, 2021. "Valid p-values and expectations of p-values revisited," Annals of the Institute of Statistical Mathematics, Springer;The Institute of Statistical Mathematics, vol. 73(2), pages 227-248, April.

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