Random time changes of Feller processes

Abstract

We show that the SDE dXt = σ(Xt-) \, dLt, X0 μ driven by a one-dimensional symnmetric α-stable L\'evy process (Lt)t ≥ 0, α ∈ (0,2], has a unique weak solution for any continuous function σ: R (0,∞) which grows at most linearly. Our approach relies on random time changes of Feller processes. We study under which assumptions the random-time change of a Feller process is a conservative Cb-Feller process and prove the existence of a class of Feller processes with decomposable symbols. In particular, we establish new existence results for Feller processes with unbounded coefficients. As a by-product, we obtain a sufficient condition in terms of the symbol of a Feller process (Xt)t ≥ 0 for the perpetual integral ∫(0,∞) f(Xs) \, ds to be infinite almost surely.