FINITE ELEMENT APPROXIMATION OF THE PARABOLIC FRACTIONAL OBSTACLE PROBLEM

Otarola Enrique; Salgado Abner J.

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FINITE ELEMENT APPROXIMATION OF THE PARABOLIC FRACTIONAL OBSTACLE PROBLEM

机译：抛物线形分数阶障碍问题的有限元逼近

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We study a discretization technique for the parabolic fractional obstacle problem in bounded domains. The fractional Laplacian is realized as the Dirichlet-to-Neumann map for a nonuniformly elliptic equation posed on a semi-infinite cylinder, which recasts our problem as a quasi-stationary elliptic variational inequality with a dynamic boundary condition. The rapid decay of the solution suggests a truncation that is suitable for numerical approximation. We discretize the truncation with a backward Euler scheme in time, and, for space, we use first-degree tensor product finite elements. We present an error analysis based on different smoothness assumptions.

机译：我们研究有界域中抛物线形分数障碍问题的离散化技术。分数拉普拉斯算子被实现为半无限圆柱体上一个非均匀椭圆方程的Dirichlet-to-Neumann映射，这将我们的问题重现为具有动态边界条件的准平稳椭圆变分不等式。解的快速衰减表明截断适合于数值逼近。我们及时采用后向Euler方案离散化截断，对于空间，我们使用一阶张量积有限元。我们提出了基于不同平滑度假设的误差分析。

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《SIAM Journal on Numerical Analysis》 |2016年第4期|共21页
作者
Otarola Enrique; Salgado Abner J.;
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正文语种 eng
中图分类数值分析;
关键词
obstacle problem; thin obstacles; free boundaries; finite elements; fractional diffusion; anisotropic elements;

机译：障碍问题;薄障碍;自由边界;有限元;分形扩散;各向异性元;

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专利

1. FINITE ELEMENT APPROXIMATION OF THE PARABOLIC FRACTIONAL OBSTACLE PROBLEM [J] . Otarola Enrique, Salgado Abner J. SIAM Journal on Numerical Analysis . 2016,第4期

机译：抛物线形分数阶障碍问题的有限元逼近
2. Fractional difference/finite element approximations for the time-space fractional telegraph equation [J] . Zhao Z., Li C. Applied mathematics and computation . 2012,第6期

机译：时空分数电报方程的分数差/有限元近似
3. Finite element error estimates in L2 for regularized discrete approximations to the obstacle problem [J] . Numerische Mathematik . 2020,第1期

机译：L2中的有限元误差估计，用于障碍问题的正则离散近似
4. Fractional Diffrence/Finite Element Approximations for the Time-Space Fractional Telegraph Equation [C] . Zhengang Zhao, Changpin Li Proceedings of the Fifth symposium on fractional differentiation and its applications . 2012

机译：时空分数电报方程的分数差分/有限元逼近
5. Analysis and finite element approximations of parabolic saddle point problems with applications to optimal control. [D] . Chrysafinos, Konstantinos. 2002

机译：抛物线鞍点问题的分析和有限元逼近，并应用于最优控制。
6. Error analysis for discretizations of parabolic problems using continuous finite elements in time and mixed finite elements in space [O] . Markus Bause, Florin A. Radu, Uwe Köcher -1

机译：使用时间连续有限元和空间混合有限元对抛物线问题离散化的误差分析
7. Finite element approximation of the parabolic fractional obstacle problem [O] . Otarola, Enrique, Salgado, Abner J. 2015

机译：抛物型分数障碍物的有限元逼近问题
8. Second-Order Finite Element Approximations and a Posteriori Error Estimation for Two-Dimensional Parabolic Systems [R] . Adjerid, S., Flaherty, J. E. 1988

机译：二维抛物型方程组的二阶有限元逼近和后验误差估计

FINITE ELEMENT APPROXIMATION OF THE PARABOLIC FRACTIONAL OBSTACLE PROBLEM

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