A chaotic representation property of the multidimensional Dunkl processes
Abstract
Dunkl processes are martingales as well as c\`adl\`ag homogeneous Markov processes taking values in Rd and they are naturally associated with a root system. In this paper we study the jumps of these processes, we describe precisely their martingale decompositions into continuous and purely discontinuous parts and we obtain a Wiener chaos decomposition of the corresponding L2 spaces of these processes in terms of adequate mixed multiple stochastic integrals.
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