Harmonic analysis of additive Levy processes

Abstract

Let X1,...,XN denote N independent d-dimensional L\'evy processes, and consider the N-parameter random field \[(t):= X1(t1)+...+XN(tN).\] First we demonstrate that for all nonrandom Borel sets F⊂eqd, the Minkowski sum (N+) F, of the range (N+) of with F, can have positive d-dimensional Lebesgue measure if and only if a certain capacity of F is positive. This improves our earlier joint effort with Yuquan Zhong KXZ:03 by removing a symmetry-type condition there. Moreover, we show that under mild regularity conditions, our necessary and sufficient condition can be recast in terms of one-potential densities. This rests on developing results in classical [non-probabilistic] harmonic analysis that might be of independent interest. As was shown in KXZ:03, the potential theory of the type studied here has a large number of consequences in the theory of L\'evy processes. We present a few new consequences here.