Published September 8, 2021 | Version v1

Numerical Solutions of Fractional Differential Equations by Using Laplace Transformation Method and Quadrature Rule

  • 1. Faculty of Industry and Mining (Khash), University of Sistan and Baluchestan, Zahedan 98155-987, Iran
  • 2. Department of Mathematics, Kharazmi University, Karaj 14911-15719, Iran
  • 3. Engineering School, DEIM, Tuscia University, 01100 Viterbo, Italy

Description

This paper introduces an efficient numerical scheme for solving a significant class of fractional differential equations. The major contributions made in this paper apply a direct approach based on a combination of time discretization and the Laplace transform method to transcribe the fractional differential problem under study into a dynamic linear equations system. The resulting problem is then solved by employing the numerical method of the quadrature rule, which is also a well-developed numerical method. The present numerical scheme, which is based on the numerical inversion of Laplace transform and equal-width quadrature rule is robust and efficient. Some numerical experiments are carried out to evaluate the performance and effectiveness of the suggested framework.

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