We address the statistical problem of evaluating R = P(X < Y ), where X and Y are two independent random variables. Bayesian parametric inference is based on the marginal posterior density of R and has been widely discussed under various distributional assumptions on X and Y . This classical approach requires both elicitation of a prior on the complete parameter and numerical integration in order to derive the marginal distribution of R. In this paper, we discuss and apply recent advances in Bayesian inference based on higher-order asymptotics and on pseudo-likelihoods, and related matching priors, which allow one to perform accurate inference on the parameter of interest R only, even for small sample sizes. The proposed approach has the ad...
Computation of the marginal likelihood from a simulated posterior distribution is central to Bayesia...
Asymptotic arguments are widely used in Bayesian inference, and in recent years there has been consi...
This paper develops new Bayesian methods for semiparametric inference in the partial linear Normal r...
We address the statistical problem of evaluating R = P(X < Y ), where X and Y are two independent ra...
We address the statistical problem of evaluating $R = P(X \lt Y)$, where $X$ and $Y$ are two indepen...
Abstract This paper reviews recent developments in higher-order asymptotics for marginal posterior d...
Prior specification for nonparametric Bayesian inference involves the difficult task of quan-tifying...
Partial prior information on the marginal distribution of an observable random variable is considere...
This paper studies Bayesian inference for θ=P(X<Y) in the case where the marginal distributions of X...
[[abstract]]Computing marginal probabilities is an important and fundamental issue in Bayesian infer...
Computing marginal probabilities is an important and fundamental issue in Bayesian inference. We pre...
The likelihood function plays a central role in the theory of higher-order asymptotics both for Baye...
The testing of two-sided hypotheses in univariate and multivariate situations is considered. The goa...
I consider parametric models with a scalar parameter of interest and multiple nuisance parameters. T...
We discuss higher-order approximations to the marginal posterior distribution for a scalar parameter...
Computation of the marginal likelihood from a simulated posterior distribution is central to Bayesia...
Asymptotic arguments are widely used in Bayesian inference, and in recent years there has been consi...
This paper develops new Bayesian methods for semiparametric inference in the partial linear Normal r...
We address the statistical problem of evaluating R = P(X < Y ), where X and Y are two independent ra...
We address the statistical problem of evaluating $R = P(X \lt Y)$, where $X$ and $Y$ are two indepen...
Abstract This paper reviews recent developments in higher-order asymptotics for marginal posterior d...
Prior specification for nonparametric Bayesian inference involves the difficult task of quan-tifying...
Partial prior information on the marginal distribution of an observable random variable is considere...
This paper studies Bayesian inference for θ=P(X<Y) in the case where the marginal distributions of X...
[[abstract]]Computing marginal probabilities is an important and fundamental issue in Bayesian infer...
Computing marginal probabilities is an important and fundamental issue in Bayesian inference. We pre...
The likelihood function plays a central role in the theory of higher-order asymptotics both for Baye...
The testing of two-sided hypotheses in univariate and multivariate situations is considered. The goa...
I consider parametric models with a scalar parameter of interest and multiple nuisance parameters. T...
We discuss higher-order approximations to the marginal posterior distribution for a scalar parameter...
Computation of the marginal likelihood from a simulated posterior distribution is central to Bayesia...
Asymptotic arguments are widely used in Bayesian inference, and in recent years there has been consi...
This paper develops new Bayesian methods for semiparametric inference in the partial linear Normal r...