On Some Perturbed Models
El-Sayed, A., Salman, S., Ibrahim, M. (2024). On Some Perturbed Models. EKB Journal Management System, 2(2), 104-108. doi: 10.21608/ajst.2024.303051.1040
Ahmed M. A. El-Sayed; Sanaa Moussa Salman; Mostafa Ibrahim. "On Some Perturbed Models". EKB Journal Management System, 2, 2, 2024, 104-108. doi: 10.21608/ajst.2024.303051.1040
El-Sayed, A., Salman, S., Ibrahim, M. (2024). 'On Some Perturbed Models', EKB Journal Management System, 2(2), pp. 104-108. doi: 10.21608/ajst.2024.303051.1040
El-Sayed, A., Salman, S., Ibrahim, M. On Some Perturbed Models. EKB Journal Management System, 2024; 2(2): 104-108. doi: 10.21608/ajst.2024.303051.1040

On Some Perturbed Models

Alexandria Journal of Science and Technology
Article 3, Volume 2, Issue 2 - Serial Number 4, December 2024, Page 104-108  XML PDF (912.29 K)
Document Type: Original Article
DOI: 10.21608/ajst.2024.303051.1040
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Authors
Ahmed M. A. El-Sayed1; Sanaa Moussa Salman2; Mostafa Ibrahim email 3
1Mathematics and computer science department, Faculty of Science, Alexandria University, Egypt
2Department of Mathematics , Faculty of Education, Alexandria University, Egypt
3department of mathematics , faculty of science , Alexandria university , Alexandria , Egypt
Abstract
This paper explores novel concepts within perturbed models, focusing on their local stability analysis of fixed points. The investigation involves numerical simulations employing bifurcation diagrams and phase diagrams to substantiate findings and delineate intricate dynamics. By leveraging these computational tools, the research aims to validate its results comprehensively.

Moreover, the theoretical implications of these new concepts are thoroughly scrutinized and compared with existing frameworks. This comparative analysis sheds light on the advancements introduced by the proposed models, highlighting their potential contributions to the field. Through rigorous examination and validation via simulations and theoretical scrutiny, the study not only confirms the stability properties of fixed points under perturbations but also elucidates the broader implications of these findings.

Furthermore, the utilization of bifurcation and phase diagrams serves to illustrate the complex behaviors and transitions observed within the models, offering a visual representation that enhances the understanding of the dynamics involved. Overall, this paper contributes to advancing the understanding of perturbed models by integrating theoretical insights with numerical validation, thus paving the way for future research in this area.
Keywords
Perturbation; Dynamical Systems; Stability; Bifurcation; chaos
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