Fractional neutral integro-differential dynamical systems with periodic BVPs
Sellappan, S., Navajothiai, E. (2025). Fractional neutral integro-differential dynamical systems with periodic BVPs. EKB Journal Management System, 16(2), 1-20. doi: 10.21608/jfca.2025.342338.1149
Selvi Sellappan; Emimal Navajothiai. "Fractional neutral integro-differential dynamical systems with periodic BVPs". EKB Journal Management System, 16, 2, 2025, 1-20. doi: 10.21608/jfca.2025.342338.1149
Sellappan, S., Navajothiai, E. (2025). 'Fractional neutral integro-differential dynamical systems with periodic BVPs', EKB Journal Management System, 16(2), pp. 1-20. doi: 10.21608/jfca.2025.342338.1149
Sellappan, S., Navajothiai, E. Fractional neutral integro-differential dynamical systems with periodic BVPs. EKB Journal Management System, 2025; 16(2): 1-20. doi: 10.21608/jfca.2025.342338.1149

Fractional neutral integro-differential dynamical systems with periodic BVPs

Journal of Fractional Calculus and Applications
Volume 16, Issue 2, 2025, Page 1-20  XML PDF (416.39 K)
Document Type: Regular research papers
DOI: 10.21608/jfca.2025.342338.1149
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Authors
Selvi Sellappan email orcid 1; Emimal Navajothiai2
1Dr. S.Selvi Assistant Professor Department of Mathematics, N.K.R. Government Arts College, Namakkal - 637001, Tamil Nadu, India.
2Department of Mathematics, N.K.R. Government Arts College, Namakkal- 637001,Tamil Nadu, India
Abstract
Fractional neutral integro-differential dynamical systems with periodic Boundary Value Problems

The primary objective of this study is to comprehensively investigate the outcomes concerning the existence and Ulam stability of a fractional dynamic system, speci cally one involving a neutral partial integro-differential equation with periodic boundary conditions on time scales, using the Caputo fractional nabla derivative.

The study applies standard fixed point methods(Krasnoselskii fixed point theorem) to derive its results, with a focus on controllability and Ulam stability. Additionally, the practical relevance of the theoretical fi ndings is showcased through an illustrative example, which includes a graphical representation through MATLAB Software.

Future work will focus on advancing numerical methods for fractional systems with delays
or nonlocal conditions, exploring new control strategies, and applying these systems
to communication networks and biomedical elds. Key areas include enhancing stability
analysis and leveraging machine learning for optimized control.

Keywords: Neutral equations, Caputo-Nabla derivative, Fixed point, Time Scales, Fractional
dynamic equation.

2020 Mathematics Subject Classification : 39A05, 37C25, 34K40, 34N05.
Keywords
Neutral equations; Caputo-Nabla derivative; Fixed point; Time Scales; Fractional dynamic equation
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