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Error estimates of finite element methods for fractional stochastic Navier–Stokes equations

机译：分数阶随机Navier–Stokes方程的有限元方法的误差估计

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摘要

Based on the Itô’s isometry and the properties of the solution operator defined by the Mittag-Leffler function, this paper gives a detailed numerical analysis of the finite element method for fractional stochastic Navier–Stokes equations driven by white noise. The discretization in space is derived by the finite element method and the time discretization is obtained by the backward Euler scheme. The noise is approximated by using the generalized

L_{2}

-projection operator. Optimal strong convergence error estimates in the

L_{2}

-norm are obtained.

机译：基于Itô的等距图和Mittag-Leffler函数定义的解算子的性质，本文对由白噪声驱动的分数阶随机Navier-Stokes方程的有限元方法进行了详细的数值分析。空间的离散化是通过有限元方法导出的，时间离散化是通过后向Euler方案获得的。通过使用广义的

L < / mi>2-投影算子。L2-范数。

著录项

期刊名称 Springer Open Choice
作者
Xiaocui Li; Xiaoyuan Yang;
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作者单位

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年(卷),期 -1(2018),1
年度 -1
页码 284
总页数 15
原文格式 PDF
正文语种
中图分类外科学;
关键词
Fractional stochastic Navier–Stokes equations Finite element method Error estimates Strong convergence;

机译：分数阶随机Navier–Stokes方程;有限元方法;误差估计;强收敛;

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外文文献
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专利

1. Error Estimates of Mixed Finite Element Methods for Time-Fractional Navier-Stokes Equations [J] . Li Xiaocui, Yang Xiaoyuan, Zhang Yinghan Journal of Scientific Computing . 2017,第2期

机译：分数阶Navier-Stokes方程混合有限元方法的误差估计
2. Error estimates of finite element methods for fractional stochastic Naviera??Stokes equations [J] . Xiaocui Li, Xiaoyuan Yang Journal of inequalities and applications . 2018,第1期

机译：分数随机Naviera–Stokes方程的有限元方法的误差估计
3. A posteriori error estimates for finite element approximation of unsteady incompressible stochastic navier-stokes equations [J] . Yang X., Duan Y., Guo Y. SIAM Journal on Numerical Analysis . 2011,第4期

机译：非定常不可压缩随机Navier-stokes方程有限元逼近的后验误差估计
4. Application of A Priori Error Estimates for Navier-Stokes Equations to Accurate Finite Element Solution [C] . P. BURDA, J. NOVOTNY, J. SISTEK WSEAS International Conferences . 2005

机译：在Navier-Stokes方程中应用先验误差估计到准确的有限元解决方案
5. Mixed finite element methods for the Stokes and Navier-Stokes equations. [D] . Wang, Chunbo. 2007

机译：Stokes和Navier-Stokes方程的混合有限元方法。
6. The meshless local Petrov–Galerkin method based on moving Kriging interpolation for solving the time fractional Navier–Stokes equations [O] . N. Thamareerat, A. Luadsong, N. Aschariyaphotha -1

机译：基于移动克里格插值的无网格局部Petrov-Galerkin方法求解时间分数Navier-Stokes方程
7. Residual A Posteriori Error Estimates for Two-Level Finite Element Methods for the Navier-Stokes Equations [O] . Volker John 2007

机译：Navier-stokes方程两层有限元残差后验误差估计

Error estimates of finite element methods for fractional stochastic Navier–Stokes equations

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