Barycentric Legendre interpolation method for solving nonlinear fractal-fractional Burgers equation
Abstract
In this paper, we formulate a numerical method to approximate the solution of non-linear fractal-fractional Burgers equation. In this model, differential operators are defined in the Atangana-Riemann-Liouville sense with Mittage-Leffler kernel. We first expand the spatial derivatives using barycentric interpolation method and then we derive an operational matrix (OM) of the fractal-fractional derivative for the Legendre polynomials. To be more precise, two approximation tools are coupled to convert the fractal-fractional Burgers equation into a system of algebraic equations which is technically uncomplicated and can be solved using available mathematical software such as MATLAB. To investigate the agreement between exact and approximate solutions, several examples are examined.
Keywords
Burgers equation; Fractal-fractional derivative; Barycenteric interpolation method; Legendre polynomials; Operational matrix
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