# On the regularisation of the noise for the Euler-Maruyama scheme with   irregular drift

**Authors:** Konstantinos Dareiotis, M\'at\'e Gerencs\'er

arXiv: 1812.04583 · 2021-03-09

## TL;DR

This paper demonstrates that the Euler-Maruyama scheme for SDEs with irregular drift coefficients converges at a rate close to 1/2 by leveraging the noise's regularising effect, extending previous results to broader classes of coefficients.

## Contribution

The paper improves the convergence rate analysis of Euler-Maruyama for irregular drifts, showing near 1/2 rate for all positive Hölder exponents and extending to Dini continuous and bounded measurable coefficients.

## Key findings

- Convergence rate is arbitrarily close to 1/2 for all α>0.
- Extension of results to Dini continuous coefficients.
- Applicable to bounded measurable coefficients in one dimension.

## Abstract

The strong rate of convergence of the Euler-Maruyama scheme for nondegenerate SDEs with irregular drift coefficients is considered. In the case of $\alpha$-H\"older drift in the recent literature the rate $\alpha/2$ was proved in many related situations. By exploiting the regularising effect of the noise more efficiently, we show that the rate is in fact arbitrarily close to $1/2$ for all $\alpha>0$. The result extends to Dini continuous coefficients, while in $d=1$ also to all bounded measurable coefficients.

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Source: https://tomesphere.com/paper/1812.04583