Bayesian predictive densities for the 2-dimensional Wishart model are investigated. The performance of predictive densities is evaluated by using the Kullback-Leibler divergence. It is proved that a Bayesian predictive density based on a prior exactly dominates that based on the Jeffreys prior if the prior density satisfies some geometric conditions. An orthogonally invariant prior is introduced and it is shown that the Bayesian predictive density based on the prior is minimax and dominates that based on the right invariant prior with respect to the triangular group.Differential geometry Green's theorem Group models Jeffreys prior Kullback-Leibler divergence Minimaxity Orthogonally invariant priors Right invariant prior
We construct geometric shrinkage priors for Kählerian signal filters. Based on the characteristics o...
Recently the quantum Bayesian prediction problem was formulated by Tanaka and Komaki (2005). It is s...
Let $X ~ Nd(q,s2I)$, $Y ~ Nd(q, s2I)$, $U ~ Nk(q, s2I)$ be independently distributed, or more genera...
AbstractBayesian predictive densities for the 2-dimensional Wishart model are investigated. The perf...
AbstractConstruction methods for prior densities are investigated from a predictive viewpoint. Predi...
Let X : μ ∼ Np(μ, vxI) and Y : μ ∼ Np(μ, vyI) be independent p-dimensional multivariate normal vecto...
AbstractThis paper addresses the problem of estimating the density of a future outcome from a multiv...
We investigate Bayesian shrinkage methods for constructing predictive distributions. We consider the...
Abstract: For general regular parametric models, we compare predictive densities under the criterion...
Let X | µ ∼ Np(µ, vxI) and Y | µ ∼ Np(µ, vyI) be independent p-dimensional multivariate normal vecto...
Alternatives to the Dirichlet prior for multinomial probabilities are explored. The Dirichlet prior ...
International audienceLet X, U, Y be spherically symmetric distributed having density η d+k/2 f η(x ...
In this paper, we highlight properties of Bayesian models in which the prior puts positive mass on a...
Suppose we observe X ~ Nm(Aβ, σ2I) and would like to estimate the predictive density p(y|β) of a fut...
Asymptotic theory, Jeffreys prior, Neyman–Scott model, Right invariant prior, Kullback–Leibler diver...
We construct geometric shrinkage priors for Kählerian signal filters. Based on the characteristics o...
Recently the quantum Bayesian prediction problem was formulated by Tanaka and Komaki (2005). It is s...
Let $X ~ Nd(q,s2I)$, $Y ~ Nd(q, s2I)$, $U ~ Nk(q, s2I)$ be independently distributed, or more genera...
AbstractBayesian predictive densities for the 2-dimensional Wishart model are investigated. The perf...
AbstractConstruction methods for prior densities are investigated from a predictive viewpoint. Predi...
Let X : μ ∼ Np(μ, vxI) and Y : μ ∼ Np(μ, vyI) be independent p-dimensional multivariate normal vecto...
AbstractThis paper addresses the problem of estimating the density of a future outcome from a multiv...
We investigate Bayesian shrinkage methods for constructing predictive distributions. We consider the...
Abstract: For general regular parametric models, we compare predictive densities under the criterion...
Let X | µ ∼ Np(µ, vxI) and Y | µ ∼ Np(µ, vyI) be independent p-dimensional multivariate normal vecto...
Alternatives to the Dirichlet prior for multinomial probabilities are explored. The Dirichlet prior ...
International audienceLet X, U, Y be spherically symmetric distributed having density η d+k/2 f η(x ...
In this paper, we highlight properties of Bayesian models in which the prior puts positive mass on a...
Suppose we observe X ~ Nm(Aβ, σ2I) and would like to estimate the predictive density p(y|β) of a fut...
Asymptotic theory, Jeffreys prior, Neyman–Scott model, Right invariant prior, Kullback–Leibler diver...
We construct geometric shrinkage priors for Kählerian signal filters. Based on the characteristics o...
Recently the quantum Bayesian prediction problem was formulated by Tanaka and Komaki (2005). It is s...
Let $X ~ Nd(q,s2I)$, $Y ~ Nd(q, s2I)$, $U ~ Nk(q, s2I)$ be independently distributed, or more genera...