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An efficient technique based on finite difference/finite element method for solution of two-dimensional space/multi-time fractional Bloch-Torrey equations

机译:基于有限差分/有限元方法的高效求解二维空间/多次分数Bloch-Torrey方程的技术

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The main aim of the current paper is to propose an efficient numerical technique for solving two-dimensional space-multi-time fractional Bloch-Torrey equations. The current research work is a generalization of [6]. The temporal direction is based on the Caputo fractional derivative with multi-order fractional derivative and the spatial directions are based on the Riemann-Liouville fractional derivative. Thus, to achieve a numerical technique, the time variable is discretized using a finite difference scheme with convergence order O-(tau(2-alpha)). Also, the space variable is discretized using the finite element method. Furthermore, for the time-discrete and the full-discrete schemes error estimate has been presented to show the unconditional stability and convergence of the developed numerical method. Finally, four test problems have been illustrated to verify the efficiency and simplicity of the proposed technique on irregular computational domains. (C) 2018 IMACS. Published by Elsevier B.V. All rights reserved.
机译:本文的主要目的是提出一种有效的数值技术,用于求解二维时空多次分数Bloch-Torrey方程。当前的研究工作是[6]的概括。时间方向基于Caputo分数阶导数和多阶分数阶导数,空间方向基于Riemann-Liouville分数阶导数。因此,为了实现数值技术,使用具有收敛阶数O-(tau(2-alpha))的有限差分方案离散时间变量。同样,空间变量使用有限元方法离散化。此外,对于时间离散和全离散方案,提出了误差估计,以表明所开发数值方法的无条件稳定性和收敛性。最后,说明了四个测试问题,以验证所提出技术在不规则计算域上的效率和简便性。 (C)2018年IMACS。由Elsevier B.V.发布。保留所有权利。

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