Abstract
We consider a Bayesian approach to multiple hypothesis testing. A
hierarchical prior model is based on imposing a prior distribution
$\pi(k)$ on the number of hypotheses arising from alternatives (false nulls).
We then apply the maximum a posteriori (MAP) rule to find the most likely
configuration of null and alternative hypotheses. The resulting MAP
procedure and its closely related step-up and step-down versions
compare ordered Bayes factors of individual hypotheses with a
sequence of critical values depending on the prior. We discuss the
relations between the proposed MAP procedure and the existing
frequentist and Bayesian counterparts. A more detailed analysis is
given for the normal data, where we show, in particular, that
choosing a specific $\pi(k)$, the MAP procedure can mimic several
known familywise error (FWE) and false discovery rate (FDR)
controlling procedures. The performance of MAP procedures is
illustrated on a simulated example.
Anno
2006
Autori IAC
Tipo pubblicazione
Altri Autori
Abramovich F., Angelini C.