Solutions of L\'evy-driven SDEs with unbounded coefficients as Feller processes

Abstract

Let (Lt)t ≥ 0 be a k-dimensional L\'evy process and σ: Rd Rd × k a continuous function such that the L\'evy-driven stochastic differential equation (SDE) dXt = σ(Xt-) \, dLt, X0 μ has a unique weak solution. We show that the solution is a Feller process whose domain of the generator contains the smooth functions with compact support if, and only if, the L\'evy measure of the driving L\'evy process (Lt)t ≥ 0 satisfies (\y ∈ Rk; |σ(x)y+x|<r\) []|x| ∞ 0.