L\'evy processes with values in locally convex Suslin spaces
Abstract
We provide a L\'evy-It\o decomposition of sample paths of L\'evy processes with values in complete locally convex Suslin spaces. This class of state spaces contains the well investigated examples of separable Banach spaces, as well as Fr\'echet or distribution spaces among many others. Sufficient conditions for the existence of a pathwise compensated Poisson integral handling infinite activity of the L\'evy process are given.
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