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引用次数: 1
摘要
我们考虑基于半拉格朗日格式和解的概率表示组合的偏微分方程的蒙特卡罗离散化。我们在一个简单的例子中研究了蒙特卡罗误差,并表明在时间步长$\delta t$和网格尺寸$\delta x$上的反cfl条件下,对于$N$ -实现的数量-相当大,我们通过一个阶项$\mathcal{O}(\sqrt{\delta t /N})$来控制该误差。我们还提供了一些数值实验来证实误差估计,并给出了一些可以用数值方法处理的方程的例子。
Analysis of the Monte-Carlo Error in a Hybrid Semi-Lagrangian Scheme
We consider Monte-Carlo discretizations of partial differential equations based on a combination of semi-lagrangian schemes and probabilistic representations of the solutions. We study the Monte-Carlo error in a simple case, and show that under an anti-CFL condition on the time-step $\delta t$ and on the mesh size $\delta x$ and for $N$ - the number of realizations - reasonably large, we control this error by a term of order $\mathcal{O}(\sqrt{\delta t /N})$. We also provide some numerical experiments to confirm the error estimate, and to expose some examples of equations which can be treated by the numerical method.
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