Tamed Euler-Maruyama method for SDEs with non-globally Lipschitz drift and multiplicative noise

Abstract

Consider the following stochastic differential equation driven by multiplicative noise on Rd with a superlinearly growing drift coefficient, align* d Xt = b (Xt) \, d t + σ (Xt) \, d Bt. align* It is known that the corresponding explicit Euler schemes may not converge. In this article, we analyze an explicit and easily implementable numerical method for approximating such a stochastic differential equation, i.e. its tamed Euler-Maruyama approximation. Under partial dissipation conditions ensuring the ergodicity, we obtain the uniform-in-time convergence rates of the tamed Euler-Maruyama process under L1-Wasserstein distance and total variation distance.