Performance of Test Supermartingale Confidence Intervals for the Success Probability of Bernoulli Trials.
J Res Natl Inst Stand Technol
; 125: 125003, 2020.
Article
em En
| MEDLINE
| ID: mdl-38343525
ABSTRACT
Given a composite null hypothesis â0, test supermartingales are non-negative supermartingales with respect to â0 with an initial value of 1. Large values of test supermartingales provide evidence against â0. As a result, test supermartingales are an effective tool for rejecting â0, particularly when the p-values obtained are very small and serve as certificates against the null hypothesis. Examples include the rejection of local realism as an explanation of Bell test experiments in the foundations of physics and the certification of entanglement in quantum information science. Test supermartingales have the advantage of being adaptable during an experiment and allowing for arbitrary stopping rules. By inversion of acceptance regions, they can also be used to determine confidence sets. We used an example to compare the performance of test supermartingales for computing p-values and confidence intervals to Chernoff-Hoeffding bounds and the "exact" p-value. The example is the problem of inferring the probability of success in a sequence of Bernoulli trials. There is a cost in using a technique that has no restriction on stopping rules, and, for a particular test supermartingale, our study quantifies this cost.
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Coleções:
01-internacional
Base de dados:
MEDLINE
Idioma:
En
Revista:
J Res Natl Inst Stand Technol
Ano de publicação:
2020
Tipo de documento:
Article