Asymptotic behavior of the multilevel type error for SDEs driven by a pure jump L\'evy process

Abstract

Motivated by the multilevel Monte Carlo method introduced by Giles [5], we study the asymptotic behavior of the normalized error process un,m(Xn-Xnm) where Xn and Xnm are respectively Euler approximations with time steps 1/n and 1/nm of a given stochastic differential equation X driven by a pure jump L\'evy process. In this paper, we prove that this normalized multilevel error converges to different non-trivial limiting processes with various sharp rates un,m depending on the behavior of the L\'evy measure around zero. Our results are consistent with those of Jacod [9] obtained for the normalized error un(Xn-X), as when letting m tends to infinity, we recover the same limiting processes. For the multilevel error, the proofs of the current paper are challenging since unlike [9] we need to deal with m dependent triangular arrays instead of one.