Abstract
We consider a stochastic differential equation and its Euler-Maruyama (EM) scheme, under some appropriate conditions, they both admit a unique invariant measure, denoted by π and πη respectively (η is the step size of the EM scheme). We construct an empirical measure Πη of the EM scheme as a statistic of πη, and use Stein’s method developed in Fang, Shao and Xu (Probab. Theory Related Fields 174 (2019) 945–979) to prove a central limit theorem of Πη. The proof of the self-normalized Cramér-type moderate deviation (SNCMD) is based on a standard decomposition on Markov chain, splitting η−1/2(Πη(.)−π(.)) into a martingale difference series sum Hη and a negligible remainder Rη. We handle Hη by the time-change technique for martingale, while prove that Rη is exponentially negligible by concentration inequalities, which have their independent interest. Moreover, we show that SNCMD holds for x=o(η−1/6), which has the same order as that of the classical result in Shao (J. Theoret. Probab. 12 (1999) 385–398), Jing, Shao and Wang (Ann. Probab. 31 (2003) 2167–2215).
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