This paper analyses the kernel density estimation on spaces of Gaussian distributions endowed with different metrics. Explicit expressions of kernels are provided for the case of the 2-Wasserstein metric on multivariate Gaussian distributions and for the Fisher metric on multivariate centred distributions. Under the Fisher metric, the space of multivariate centred Gaussian distributions is isometric to the space of symmetric positive definite matrices under the affine-invariant metric and the space of univariate Gaussian distributions is isometric to the hyperbolic space. Thus kernel are also valid on these spaces. The density estimation is successfully applied to a classification problem of electro-encephalographic signals
International audienceThe multidimensional Gaussian kernel-density estimation (G-KDE) is a powerful ...
A new family of kernels for statistical learning is introduced that ex-ploits the geometric structur...
We consider kernel density estimation in the multivariate case, focusing on the use of some elements...
International audienceThis paper analyzes the kernel density estimation on spaces of Gaussian distri...
We construct a kernel density estimator on symmetric spaces of non-compact type and establish an upp...
Main techniques of probability density estimation on Riemannian manifolds are reviewed in the case o...
In this work, we propose a way to construct Gaussian processes indexed by multidimensional distribut...
International audienceThis paper studies probability density estimation on the Siegel space. The Sie...
A family of kernels for statistical learning is introduced that exploits the geometric structure of ...
A family of kernels for statistical learning is introduced that exploits the geometric structure of ...
AbstractThis paper develops the theory of density estimation on the space Sm of all m × m symmetric ...
A new family of kernels for statistical learning is introduced that exploits the geometric structur...
In this paper, we propose a new method to estimate the multivariate conditional density, f(mjx), a d...
We propose kernel type estimators for the density function of non negative random variables, where t...
AbstractThe Riemannian metric on the manifold of positive definite matrices is defined by a kernel f...
International audienceThe multidimensional Gaussian kernel-density estimation (G-KDE) is a powerful ...
A new family of kernels for statistical learning is introduced that ex-ploits the geometric structur...
We consider kernel density estimation in the multivariate case, focusing on the use of some elements...
International audienceThis paper analyzes the kernel density estimation on spaces of Gaussian distri...
We construct a kernel density estimator on symmetric spaces of non-compact type and establish an upp...
Main techniques of probability density estimation on Riemannian manifolds are reviewed in the case o...
In this work, we propose a way to construct Gaussian processes indexed by multidimensional distribut...
International audienceThis paper studies probability density estimation on the Siegel space. The Sie...
A family of kernels for statistical learning is introduced that exploits the geometric structure of ...
A family of kernels for statistical learning is introduced that exploits the geometric structure of ...
AbstractThis paper develops the theory of density estimation on the space Sm of all m × m symmetric ...
A new family of kernels for statistical learning is introduced that exploits the geometric structur...
In this paper, we propose a new method to estimate the multivariate conditional density, f(mjx), a d...
We propose kernel type estimators for the density function of non negative random variables, where t...
AbstractThe Riemannian metric on the manifold of positive definite matrices is defined by a kernel f...
International audienceThe multidimensional Gaussian kernel-density estimation (G-KDE) is a powerful ...
A new family of kernels for statistical learning is introduced that ex-ploits the geometric structur...
We consider kernel density estimation in the multivariate case, focusing on the use of some elements...