Natural exponential families and self-decomposability

Within the framework of the quadratic natural exponential families we construct a basis of polynomials orthogonal with respect to the posterior density. This construction is adapted from Walter and Hamedani (Ann. Statist. 3 (1991) 1191) and we exploit them to establish lower bounds for the posterior

Let be a positive measure deÿned on the product of two vector spaces E = E 1 × E 2 . Let F = F( ) be a natural exponential family (NEF) generated by such that the projection of F on E 1 constitutes a NEF on E 1 . This property, called a cut on E 1 , has been deÿned and characterized by Barndor -Niel

In this article, we link the ÿrst passage times on zero and one for certain LÃ evy processes on R and for right continuous random walks on Z. We use it to get a probabilistic interpretation of the notion of inversion between natural exponential families. The application to cubic variance functions i

We develop a combinatorial theory for the operation of forming the logarithm of generating functions associated with covariant functors on the category of finite sets and bijective maps. This leads to a rather general and flexible exponential principle for labeled combinatorial structures. We also i