Riesz Exponential Families on Symmetric Cones

Let E be a simple Euclidean Jordan algebra of rank r and let Ω be its symmetric cone. Given a Jordan frame on E, the generalized power Δ s (−θ −1) defined on −Ω is the Laplace transform of some positive measure R s on E if and only if s is in a given subset Ξ of R r . The aim of this paper is to study the natural exponential families (NEFs) F(R s ) associated to the measures R s . We give a condition on s so that R s generates a NEF, we calculate the variance function of F(R s ) and we show that a NEF F on E is invariant by the triangular group if and only if there exists s in Ξ such that either F=F(R s ) or F is the image of F(R s ) under the map x↦−x.