Dataset Information
A new calibrated bayesian internal goodness-of-fit method: sampled posterior p-values as simple and general p-values that allow double use of the data.
Ontology highlight
ABSTRACT: Background
Recent approaches mixing frequentist principles with bayesian inference propose internal goodness-of-fit (GOF) p-values that might be valuable for critical analysis of bayesian statistical models. However, GOF p-values developed to date only have known probability distributions under restrictive conditions. As a result, no known GOF p-value has a known probability distribution for any discrepancy function.Methodology/principal findings
We show mathematically that a new GOF p-value, called the sampled posterior p-value (SPP), asymptotically has a uniform probability distribution whatever the discrepancy function. In a moderate finite sample context, simulations also showed that the SPP appears stable to relatively uninformative misspecifications of the prior distribution.Conclusions/significance
These reasons, together with its numerical simplicity, make the SPP a better canonical GOF p-value than existing GOF p-values.
SUBMITTER: Gosselin F
PROVIDER: S-EPMC3060804 | biostudies-literature | 2011 Mar
REPOSITORIES: biostudies-literature
Publications
A new calibrated bayesian internal goodness-of-fit method: sampled posterior p-values as simple and general p-values that allow double use of the data.
PloS one 20110318 3
<h4>Background</h4>Recent approaches mixing frequentist principles with bayesian inference propose internal goodness-of-fit (GOF) p-values that might be valuable for critical analysis of bayesian statistical models. However, GOF p-values developed to date only have known probability distributions under restrictive conditions. As a result, no known GOF p-value has a known probability distribution for any discrepancy function.<h4>Methodology/principal findings</h4>We show mathematically that a new ...[more]