Review of solution Fractal Differential Equations via the Riemann-Liouville
DOI:
https://doi.org/10.55202/ajms.v2i2.148Keywords:
Riemann –Liouville, Fractal Differential Equations, Power Series MethodAbstract
In this paper, the definitions, concepts, and basics of linear and nonlinear fractal differential equations of both homogeneous and heterogeneous types were studied, and some methods for solving fractal differential equations were presented with an explanation of each method and how to solve the equation in it An example was taken for each method that was presented to show how to solve in this way. Among the methods that were presented are (the special method, the Laplace transform Method, the Inverse Fractional Shehu Transform Method, The Power Series Method, The generalized Mittag-Leffler method, Spline Interpolation Techniques for Approximating the Solution of Fractional Differential Equations.
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