On the uniform convergence of random series in Skorohod space and representations of c\`adl\`ag infinitely divisible processes

Abstract

Let Xn be independent random elements in the Skorohod space D([0,1];E) of c\`adl\`ag functions taking values in a separable Banach space E. Let Sn=Σj=1nXj. We show that if Sn converges in finite dimensional distributions to a c\`adl\`ag process, then Sn+yn converges a.s. pathwise uniformly over [0,1], for some yn∈ D([0,1];E). This result extends the It\o-Nisio theorem to the space D([0,1];E), which is surprisingly lacking in the literature even for E=R. The main difficulties of dealing with D([0,1];E) in this context are its nonseparability under the uniform norm and the discontinuity of addition under Skorohod's J1-topology. We use this result to prove the uniform convergence of various series representations of c\`adl\`ag infinitely divisible processes. As a consequence, we obtain explicit representations of the jump process, and of related path functionals, in a general non-Markovian setting. Finally, we illustrate our results on an example of stable processes. To this aim we obtain new criteria for such processes to have c\`adl\`ag modifications, which may also be of independent interest.