In a decision-theoretic framework, criteria for selecting the optimal sample size for an experiment can be based on the Bayes risk of a decision function, i.e. the expected value of the risk function with respect to a prior distribution that describes a design scenario. In the presence of uncertainty on such scenario, an entire class of parametric distributions can be taken into account. The resulting robust optimal sample size is the one yielding a su ciently small value for the largest risk over the class. In this article we illustrate this robust sample size determination approach for a one-sided testing problem on a normal mean, that is the typical set-up of a superiority clinical trial with continuous endpoints.
On the Bayes risk induced by alternative design priors for sample size choice / DE SANTIS, Fulvio; Gubbiotti, Stefania; Mariani, Francesco. - (2023), pp. 189-197. - AIRO SPRINGER SERIES.
On the Bayes risk induced by alternative design priors for sample size choice
Fulvio De Santis;Stefania Gubbiotti
;Francesco Mariani
2023
Abstract
In a decision-theoretic framework, criteria for selecting the optimal sample size for an experiment can be based on the Bayes risk of a decision function, i.e. the expected value of the risk function with respect to a prior distribution that describes a design scenario. In the presence of uncertainty on such scenario, an entire class of parametric distributions can be taken into account. The resulting robust optimal sample size is the one yielding a su ciently small value for the largest risk over the class. In this article we illustrate this robust sample size determination approach for a one-sided testing problem on a normal mean, that is the typical set-up of a superiority clinical trial with continuous endpoints.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
