Pages that link to "Item:Q3971907"

The following pages link to Les familles exponentielles à variance quadratique homogène sont des lois de Wishart sur un cône symétrique. (Exponential families with a homogeneous quadratic variance are Wishart distributions on symmetric cones) (Q3971907):

Displaying 15 items.

• A characterization of Poisson-Gaussian families by generalized variance (Q850750) (← links)
• The diagonal multivariate natural exponential families and their classification (Q1337957) (← links)
• The \(2d+4\) simple quadratic natural exponential families on \(\mathbb{R}^ d\) (Q1354423) (← links)
• Exponential and Bayesian conjugate families: Review and extensions. (With discussion) (Q1367084) (← links)
• Enriched conjugate and reference priors for the Wishart family on symmetric cones (Q1431436) (← links)
• Wishart distributions on homogeneous cones (Q1770893) (← links)
• The Lukacs-Olkin-Rubin characterization of Wishart distributions on symmetric cones (Q1816572) (← links)
• Reference priors for exponential families (Q1869068) (← links)
• Craig-Sakamoto's theorem for the Wishart distributions on symmetric cones (Q1915257) (← links)
• Enriched standard conjugate priors and the right invariant prior for Wishart distributions (Q2101463) (← links)
• Information geometry and Hamiltonian systems on Lie groups (Q2117860) (← links)
• On Riesz and Wishart distributions associated with decomposable undirected graphs (Q2267581) (← links)
• Why Jordan algebras are natural in statistics: quadratic regression implies Wishart distributions (Q3169210) (← links)
• Orthogonal polynomials with a resolvent-type generating function (Q3518195) (← links)
• Characterization of the Riesz exponential family on homogeneous cones (Q5237142) (← links)