Likelihood, Replicability and Robbins' Confidence Sequences

Summary The widely claimed replicability crisis in science may lead to revised standards of significance. The customary frequentist confidence intervals, calibrated through hypothetical repetitions of the experiment that is supposed to have produced the data at hand, rely on a feeble concept of repl...

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Veröffentlicht in:	International statistical review 2020-12, Vol.88 (3), p.599-615
Hauptverfasser:	Pace, Luigi, Salvan, Alessandra
Format:	Artikel
Sprache:	eng
Schlagworte:	Confidence intervals confidence region Enlargement Inference Laplace expansion profile likelihood revision of standards Statistical analysis statistical evidence
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container_title	International statistical review
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creator	Pace, Luigi Salvan, Alessandra
description	Summary The widely claimed replicability crisis in science may lead to revised standards of significance. The customary frequentist confidence intervals, calibrated through hypothetical repetitions of the experiment that is supposed to have produced the data at hand, rely on a feeble concept of replicability. In particular, contradictory conclusions may be reached when a substantial enlargement of the study is undertaken. To redefine statistical confidence in such a way that inferential conclusions are non‐contradictory, with large enough probability, under enlargements of the sample, we give a new reading of a proposal dating back to the 60s, namely, Robbins' confidence sequences. Directly bounding the probability of reaching, in the future, conclusions that contradict the current ones, Robbins' confidence sequences ensure a clear‐cut form of replicability when inference is performed on accumulating data. Their main frequentist property is easy to understand and to prove. We show that Robbins' confidence sequences may be justified under various views of inference: they are likelihood‐based, can incorporate prior information and obey the strong likelihood principle. They are easy to compute, even when inference is on a parameter of interest, especially using a closed form approximation from normal asymptotic theory.
doi_str_mv	10.1111/insr.12355
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The customary frequentist confidence intervals, calibrated through hypothetical repetitions of the experiment that is supposed to have produced the data at hand, rely on a feeble concept of replicability. In particular, contradictory conclusions may be reached when a substantial enlargement of the study is undertaken. To redefine statistical confidence in such a way that inferential conclusions are non‐contradictory, with large enough probability, under enlargements of the sample, we give a new reading of a proposal dating back to the 60s, namely, Robbins' confidence sequences. Directly bounding the probability of reaching, in the future, conclusions that contradict the current ones, Robbins' confidence sequences ensure a clear‐cut form of replicability when inference is performed on accumulating data. Their main frequentist property is easy to understand and to prove. 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subjects	Confidence intervals confidence region Enlargement Inference Laplace expansion profile likelihood revision of standards Statistical analysis statistical evidence
title	Likelihood, Replicability and Robbins' Confidence Sequences
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