Abstract
In this paper, the researcher proposes a simple mathematical model consisting of mutualistic interactions among two-species with constant harvesting. Mutualism is one kind of interaction that ends up being a win-win situation for both species involved. The interacting species benefit from this interaction and ultimately are better adapted for continuous existence. The harvesting function is implemented to describe the rate of removal of the species. This paper aims to investigate the global stability of the unique positive equilibrium point of the model. The global stability of the model is studied by using Lyapunov function method. By constructing a suitable Lyapunov function, it has been proven that the unique positive equilibrium point is globally asymptotically stable in a nonlinear system. Finally, numerical simulation is shown to illustrate theoretical results and to simulate the trajectories around the stable equilibrium point. From the numerical analysis, it is observed that both the species persist.
Metadata
Item Type: | Article |
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Creators: | Creators Email / ID Num. Ahmad, Rusliza rusliza259@uitm.edu.my |
Subjects: | Q Science > Q Science (General) Q Science > QA Mathematics > Philosophy > Mathematical logic > Constructive mathematics > Algorithms |
Divisions: | Universiti Teknologi MARA, Perak > Tapah Campus > Faculty of Computer and Mathematical Sciences |
Journal or Publication Title: | Mathematical Sciences and Informatics Journal (MIJ) |
UiTM Journal Collections: | UiTM Journal > Mathematical Science and Information Journal (MIJ) |
ISSN: | 2735-0703 |
Volume: | 1 |
Number: | 2 |
Page Range: | pp. 1-11 |
Keywords: | Mutualism Model; Constant Harvesting; Global Stability; Lyapunov Function |
Date: | November 2020 |
URI: | https://ir.uitm.edu.my/id/eprint/38141 |