Drift-implicit Euler scheme for sandwiched processes driven by H\"older noises

Abstract

In this paper, we analyze the drift-implicit (or backward) Euler numerical scheme for a class of stochastic differential equations with unbounded drift driven by an arbitrary λ-H\"older continuous process, λ∈(0,1). We prove that, under some mild moment assumptions on the H\"older constant of the noise, the Lr(;L∞([0,T]))-rate of convergence is equal to λ. To exemplify, we consider numerical schemes for the generalized Cox--Ingersoll-Ross and Tsallis--Stariolo--Borland models. The results are illustrated by simulations.