Randomised Euler-Maruyama Method for SDEs with H\"older Continuous Drift Coefficient Driven by α-stable L\'evy Process

Abstract

In this paper, we examine the performance of randomised Euler-Maruyama (EM) method for additive time-inhomogeneous SDEs with an irregular drift driven by symmetric α-table process, α∈ (1,2). In particular, the drift is assumed to be β-H\"older continuous in time and bounded η-H\"older continuous in space with β,η∈ (0,1]. The strong order of convergence of the randomised EM in Lp-norm is shown to be 1/2+(β (η/α)(1/2))- for an arbitrary ∈ (0,1/2), higher than the one of standard EM, which cannot exceed β. The result for the case of α ∈ (1,2) extends the almost optimal order of convergence of randomised EM obtained in (arXiv:2501.15527) for SDEs driven by Gaussian noise (α=2), and coincides with the performance of EM method in simulating time-homogenous SDEs driven by α-stable process considered in (arXiv:2208.10052). Various experiments are presented to validate the theoretical performance.