A new approximation solutions for Fractional Order Biological  Population Model

Ghazwan Ali Abdul Hussein; Djelloul Ziane

doi:10.32792/jeps.v14i3.444

Authors

Ghazwan Ali Abdul Hussein College of Education for Pure Science -University of ThiQar
Djelloul Ziane 2Laboratory of Mathematics and its applications (LAMAP), University of Oran1, Oran, Algeria.

DOI:

https://doi.org/10.32792/jeps.v14i3.444

Keywords:

Fractional-order biological population model; homotopy permutation method; Atangana- Baleanu operator.

Abstract

The homotopy permutation approach is used in this article to solve the fractional-order biological population model (FOBPM). The fractional derivative is defined using the Atangana-Baleanu operator (ABO). The suggested technique provides a number of solutions for FOBPM. The HPM technique is regarded as one of the finest analytical processes for solving fractional-order, nonlinear PDEs, notably the FOBPM, since it requires less computations and has a greater rate of convergence than other analytical approaches.

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A new approximation solutions for Fractional Order Biological Population Model

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