Solving fractional differential equations numerically

In this paper we present a brief review about fractional calculus and also the fractional Adam-Bashforth method for solving fractional differential equations. The fractional Adam-Bashforth method is due to Diethelm et al. [¹[1] K. Diethelm, N.J. Ford e A.D. Freed, Nonlinear Dynamics 29, 3 (2002).] and is characterized by its efficiency, as it considers the memory effects of fractional differentiation. The presentation is performed in a pedagogical perspective, delivered to beginner in the subject. In this context, some examples are presented and applications are discussed.

Keywords
Fractional Calculus; Caputo’s Derivative; Fractional Adam-Bashforth Method

Authorship

A. K. F. Mendonça

Universidade de Brasília, Faculdade Gama, Setor Leste (Gama), 72444-240, Brasília, DF, Brasil.Universidade de BrasíliaBrasilBrasília, DF, BrasilUniversidade de Brasília, Faculdade Gama, Setor Leste (Gama), 72444-240, Brasília, DF, Brasil.

T. S. Evangelista

V. C. Rispoli ^** Endereço de correspondência: vrispoli@unb.br

http://orcid.org/0000-0003-0945-786X

R. G. G. Amorim

Universidade de Brasília, Instituto de Física, 70910-900, Brasília, DF, Brasil.Universidade de BrasíliaBrasilBrasília, DF, BrasilUniversidade de Brasília, Instituto de Física, 70910-900, Brasília, DF, Brasil.

http://orcid.org/0000-0001-6532-3087

* Endereço de correspondência: vrispoli@unb.br

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