We construct geometric shrinkage priors for Kählerian signal filters. Based on the characteristics of Kähler manifolds, an efficient and robust algorithm for finding superharmonic priors which outperform the Jeffreys prior is introduced. Several ansätze for the Bayesian predictive priors are also suggested. In particular, the ansätze related to Kähler potential are geometrically intrinsic priors to the information manifold of which the geometry is derived from the potential. The implication of the algorithm to time series models is also provided
In this paper, Bayesian nonlinear filtering is considered from the viewpoint of information geometry...
We address a three-tier numerical framework based on nonlinear manifold learning for the forecasting...
Let X | µ ∼ Np(µ, vxI) and Y | µ ∼ Np(µ, vyI) be independent p-dimensional multivariate normal vecto...
We construct geometric shrinkage priors for Kählerian signal filters. Based on the characteristics o...
We prove the correspondence between the information geometry of a signal filter and a Kähler manifol...
Bayesian predictive densities for the 2-dimensional Wishart model are investigated. The performance ...
Many problems in science and engineering involve estimating a dynamic signal from indirect measureme...
Asymptotic theory, Jeffreys prior, Neyman–Scott model, Right invariant prior, Kullback–Leibler diver...
We investigate Bayesian shrinkage methods for constructing predictive distributions. We consider the...
When using Bayesian inference, one needs to choose a prior distribution for parameters. The well-kno...
: We present a new and systematic method of approximating exact nonlinear filters with finite dimens...
International audienceLaplace's "add-one" rule of succession modifies the observed frequencies in a ...
This dissertation is an investigation into the intersections between differential geometry and Bayes...
A priori dimension reduction is a widely adopted technique for reducing the computational complexity...
In a range of fields including the geosciences, molecular biology, robotics and computer vision, one...
In this paper, Bayesian nonlinear filtering is considered from the viewpoint of information geometry...
We address a three-tier numerical framework based on nonlinear manifold learning for the forecasting...
Let X | µ ∼ Np(µ, vxI) and Y | µ ∼ Np(µ, vyI) be independent p-dimensional multivariate normal vecto...
We construct geometric shrinkage priors for Kählerian signal filters. Based on the characteristics o...
We prove the correspondence between the information geometry of a signal filter and a Kähler manifol...
Bayesian predictive densities for the 2-dimensional Wishart model are investigated. The performance ...
Many problems in science and engineering involve estimating a dynamic signal from indirect measureme...
Asymptotic theory, Jeffreys prior, Neyman–Scott model, Right invariant prior, Kullback–Leibler diver...
We investigate Bayesian shrinkage methods for constructing predictive distributions. We consider the...
When using Bayesian inference, one needs to choose a prior distribution for parameters. The well-kno...
: We present a new and systematic method of approximating exact nonlinear filters with finite dimens...
International audienceLaplace's "add-one" rule of succession modifies the observed frequencies in a ...
This dissertation is an investigation into the intersections between differential geometry and Bayes...
A priori dimension reduction is a widely adopted technique for reducing the computational complexity...
In a range of fields including the geosciences, molecular biology, robotics and computer vision, one...
In this paper, Bayesian nonlinear filtering is considered from the viewpoint of information geometry...
We address a three-tier numerical framework based on nonlinear manifold learning for the forecasting...
Let X | µ ∼ Np(µ, vxI) and Y | µ ∼ Np(µ, vyI) be independent p-dimensional multivariate normal vecto...