一类线性随机偏微分方程的蒙特卡罗格式

IF 0.8 Q3 STATISTICS & PROBABILITY Monte Carlo Methods and Applications Pub Date : 2021-04-24 DOI:10.1515/mcma-2021-2088
Takuya Nakagawa, Akihiro Tanaka
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引用次数: 1

摘要

摘要本文研究了具有有界可测系数和不同边界条件的时空白噪声驱动的线性随机偏微分方程解的期望模拟。首先提出了线性随机偏微分方程解的期望的蒙特卡罗式方法,并证明了其弱速率误差的上界。此外,我们还证明了该方法的中心极限定理,从而得到了该方法的置信区间。作为应用,蒙特卡罗格式适用于各种边界条件下的随机热方程,并给出了数值实验结果,证实了本文的理论结果。
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On a Monte Carlo scheme for some linear stochastic partial differential equations
Abstract The aim of this paper is to study the simulation of the expectation for the solution of linear stochastic partial differential equation driven by the space-time white noise with the bounded measurable coefficient and different boundary conditions. We first propose a Monte Carlo type method for the expectation of the solution of a linear stochastic partial differential equation and prove an upper bound for its weak rate error. In addition, we prove the central limit theorem for the proposed method in order to obtain confidence intervals for it. As an application, the Monte Carlo scheme applies to the stochastic heat equation with various boundary conditions, and we provide the result of numerical experiments which confirm the theoretical results in this paper.
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来源期刊
Monte Carlo Methods and Applications
Monte Carlo Methods and Applications STATISTICS & PROBABILITY-
CiteScore
1.20
自引率
22.20%
发文量
31
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