Approximation in law of locally α-stable L\'evy-type processes by non-linear regressions

Abstract

We study a real-valued L\'evy-type process X, which is locally α-stable in the sense that its jump kernel is a combination of a `principal' (state dependent) α-stable part with a `residual' lower order part. We show that under mild conditions on the local characteristics of a process (the jump kernel and the velocity field) the process is uniquely defined, is Markov, and has the strong Feller property. We approximate X in law by a non-linear regression Xxt=ft(x)+t1/αUxt with a deterministic regressor term ft(x) and α-stable innovation term Uxt, and provide error estimates for such an approximation. A case study is performed, revealing different types of assumptions which lead to various choices of regressor/innovation terms and various types of the estimates. The assumptions are quite general, cover the super-critical case α<1, and allow non-symmetry of the L\'evy kernel and unboundedness of the drift coefficient.