The current paper introduces new prior distributions on the univariate normal model, with the aim of applying them to the classification of univariate normal populations. These new prior distributions are entirely based on the Riemannian geometry of the univariate normal model, so that they can be thought of as “Riemannian priors”. Precisely, if {pθ ; θ ∈ Θ} is any parametrization of the univariate normal model, the paper considers prior distributions G( θ - , γ) with hyperparameters θ - ∈ Θ and γ > 0, whose density with respect to Riemannian volume is proportional to exp(−d2(θ, θ - )/2γ2), where d2(θ, θ - ) is the square of Rao’s Riemannian distance. The distributions G( θ - , γ) are termed Gaussian distributions on the univ...
This paper addresses the task of eliciting an informative prior distribution for multinomial models....
The normal distribution is a very important distribution in probability theory and statisticsand has...
We introduce generalized partially linear models with covariates on Riemannian manifolds. These mode...
When using Bayesian inference, one needs to choose a prior distribution for parameters. The well-kno...
International audienceRiemannian Gaussian distributions were initially introduced as basic building ...
In this paper we leverage on probability over Riemannian manifolds to rethink the interpretation of...
In the Bayesian analysis with a statistical model, it is inevitable to determine a prior distributio...
It is well known that the Fisher information induces a Riemannian geometry on parametric families of...
We propose a novel Riemannian geometric framework for variational inference in Bayesian models based...
We study a probabilistic numerical method for the solution of both\u000A boundary and initial value ...
In this work we study sensitivity to hyperprior specification of the dispersion parameter in a...
AbstractA general real matrix-variate probability model is introduced here, which covers almost all ...
Alternatives to the Dirichlet prior for multinomial probabilities are explored. The Dirichlet prior ...
Gaussian graphical models are useful tools for exploring network structures in multivariate normal d...
A metric tensor for Riemann manifold Monte Carlo particularly suited for nonlinear Bayesian hierarch...
This paper addresses the task of eliciting an informative prior distribution for multinomial models....
The normal distribution is a very important distribution in probability theory and statisticsand has...
We introduce generalized partially linear models with covariates on Riemannian manifolds. These mode...
When using Bayesian inference, one needs to choose a prior distribution for parameters. The well-kno...
International audienceRiemannian Gaussian distributions were initially introduced as basic building ...
In this paper we leverage on probability over Riemannian manifolds to rethink the interpretation of...
In the Bayesian analysis with a statistical model, it is inevitable to determine a prior distributio...
It is well known that the Fisher information induces a Riemannian geometry on parametric families of...
We propose a novel Riemannian geometric framework for variational inference in Bayesian models based...
We study a probabilistic numerical method for the solution of both\u000A boundary and initial value ...
In this work we study sensitivity to hyperprior specification of the dispersion parameter in a...
AbstractA general real matrix-variate probability model is introduced here, which covers almost all ...
Alternatives to the Dirichlet prior for multinomial probabilities are explored. The Dirichlet prior ...
Gaussian graphical models are useful tools for exploring network structures in multivariate normal d...
A metric tensor for Riemann manifold Monte Carlo particularly suited for nonlinear Bayesian hierarch...
This paper addresses the task of eliciting an informative prior distribution for multinomial models....
The normal distribution is a very important distribution in probability theory and statisticsand has...
We introduce generalized partially linear models with covariates on Riemannian manifolds. These mode...