Hoeffding decompositions for exchangeable sequences and chaotic representation of functionals of Dirichlet processes

This paper consists of three parts. In Part I, we obtain results on the integrability of functional (of exponential type) of Dirichlet processes. In Part II, we give a striking probabilistic representation of semigroup (probably non-Markovian) associated with a non-divergence operator. Part III is d

Martin boundaries and integral representations of positive functions which are harmonic in a bounded domain D with respect to Brownian motion are well understood. Unlike the Brownian case, there are two different kinds of harmonicity with respect to a discontinuous symmetric stable process. One kind

We study a class of continuous additive functionals for super-Brownian and super-stable processes. These are given in terms of a Tanaka-like formula that generalizes the one for local times. We give representations for these additive functionals in terms of the corresponding local times. As an examp