First order convergence of weak Wong--Zakai approximations of L\'evy driven Marcus SDEs

Abstract

For solutions X=(Xt)t∈[0,T] of L\'evy-driven Marcus stochastic differential equations we study the Wong--Zakai type time discrete approximations X=( Xkh)0≤ k≤ T/h, h>0, and establish the first order convergence |E f(XT)-E f(XhT)|≤ C h for f∈ Cb4.