Short-time behavior of solutions to L\'evy-driven SDEs

Abstract

We consider solutions of L\'evy-driven stochastic differential equations of the form d Xt=σ(Xt-)d Lt, X0=x where the function σ is twice continuously differentiable and maximal of linear growth and the driving L\'evy process L=(Lt)t≥0 is either vector or matrix-valued. While the almost sure short-time behavior of L\'evy processes is well-known and can be characterized in terms of the characteristic triplet, there is no complete characterization of the behavior of the process X. Using methods from stochastic calculus, we derive limiting results for stochastic integrals of the from t-p∫0+tσ(Xt-)d Lt to show that the behavior of the quantity t-p(Xt-X0) for t0 almost surely mirrors the behavior of t-pLt. Generalizing tp to a suitable function f:[0,∞)→R then yields a tool to derive explicit LIL-type results for the solution from the behavior of the driving L\'evy process.