Convergence Rates for the Truncated Euler-Maruyama Method for Nonlinear Stochastic Differential Equations

Xuejing MENG, Linfeng LYU
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Abstract

In this paper, our main aim is to investigate the strong convergence rate of the truncated Euler-Maruyama approximations for stochastic differential equations with superlinearly growing drift coefficients. When the diffusion coefficient is polynomially growing or linearly growing, the strong convergence rate of arbitrarily close to one half is established at a single time T or over a time interval [0, T ], respectively. In both situations, the common one-sided Lipschitz and polynomial growth conditions for the drift coefficients are not required. Two examples are provided to illustrate the theory.
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非线性随机微分方程的截断Euler-Maruyama方法的收敛速率
本文的主要目的是研究具有超线性增长漂移系数的随机微分方程的截断Euler-Maruyama近似的强收敛速率。当扩散系数多项式增长或线性增长时,分别在单个时间T或时间区间[0,T]建立任意接近二分之一的强收敛速率。在这两种情况下,漂移系数不需要常见的单侧Lipschitz和多项式增长条件。给出了两个例子来说明这一理论。
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Wuhan University Journal of Natural Sciences
Wuhan University Journal of Natural Sciences Multidisciplinary-Multidisciplinary
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0.40
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2485
期刊介绍: Wuhan University Journal of Natural Sciences aims to promote rapid communication and exchange between the World and Wuhan University, as well as other Chinese universities and academic institutions. It mainly reflects the latest advances being made in many disciplines of scientific research in Chinese universities and academic institutions. The journal also publishes papers presented at conferences in China and abroad. The multi-disciplinary nature of Wuhan University Journal of Natural Sciences is apparent in the wide range of articles from leading Chinese scholars. This journal also aims to introduce Chinese academic achievements to the world community, by demonstrating the significance of Chinese scientific investigations.
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