二维非线性分数阶反应-平流-扩散方程的配点法数值解

Pub Date : 2021-06-01 DOI:10.2478/auom-2021-0027
Manpal Singh, S. Das, Rajeev, E. Crăciun
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引用次数: 3

摘要

摘要本文利用Lucas运算矩阵,采用配点法对二维非线性多项时间分数扩散方程进行数值求解。该方法用卢卡斯多项式作为基函数来表示问题的解。为了确定未知量,将残差条件、初始条件和边界条件配置在选定的点上,从而产生一个非线性代数方程组,并对这些方程组进行了数值求解。该方法提供了高精度的数值解。通过展开多项式的项,可以提高问题近似解的精度。通过对存在的已知问题的误差分析,验证了该方法的准确性和有效性。
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Numerical solution of two-dimensional nonlinear fractional order reaction-advection-diffusion equation by using collocation method
Abstract In this article, two-dimensional nonlinear and multi-term time fractional diffusion equations are solved numerically by collocation method, which is used with the help of Lucas operational matrix. In the proposed method solutions of the problems are expressed in terms of Lucas polynomial as basis function. To determine the unknowns, the residual, initial and boundary conditions are collocated at the chosen points, which produce a system of nonlinear algebraic equations those have been solved numerically. The concerned method provides the highly accurate numerical solution. The accuracy of the approximate solution of the problem can be increased by expanding the terms of the polynomial. The accuracy and efficiency of the concerned method have been authenticated through the error analyses with some existing problems whose solutions are already known.
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