Journal
MATHEMATICAL METHODS IN THE APPLIED SCIENCES
Volume 44, Issue 5, Pages 3485-3508Publisher
WILEY
DOI: 10.1002/mma.6955
Keywords
3 x 6systems; boundedness; equilibrium point; stability
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This study investigates the equilibrium points, local and global dynamics, rate of convergence, instability, and boundedness of positive solutions of some rational systems of difference equations. In addition, it explores the local dynamics around equilibrium points of the discrete-time Levin's model as an application in mathematical biology. The obtained results are then numerically verified.
We explore the equilibrium points, local and global dynamics, rate of convergence, instability and boundedness of positive solution of some rational systems of difference equations. As an application of difference equations in mathematical biology, we also explore the local dynamics about equilibrium points of the discrete-time Levin's model. Finally, obtained results are verified numerically.
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