Publication: On a study of the representation of solutions of a $ \Psi $-Caputo fractional differential equations with a single delay
Loading...
Date
Advisor
Journal Title
Journal ISSN
Volume Title
Publisher
American Institute of Mathematical Sciences (AIMS)
Type
Abstract
<abstract><p>We give a representation of solutions to linear nonhomogeneous $ \Psi $-fractional delayed differential equations with noncommutative matrices. We newly define $ \Psi $-delay perturbation of Mittag-Leffler type matrix function with two parameters and apply the method of variation of constants to obtain the representation of the solutions. We investigate the existence and uniqueness of solutions for a class of $ \Psi $-fractional delayed semilinear differential equations by using Banach Fixed Point Theorem. Further, we establish the Ulam-Hyers stability result for the analyzed problem. Finally, we provide some examples to illustrate the applicability of our results.</p></abstract>
Description
Subject
T57-57.97, Applied mathematics. Quantitative methods, ψ-caputo derivative representation of solutions, Perturbations of functional-differential equations, mittag-leffler type matrix function, fractional linear and nonlinear systems, delayed perturbation, \(\Psi\)-Caputo derivative representation of solutions, Linear functional-differential equations, Mittag-Leffler type matrix function, QA1-939, Mathematics, Functional-differential equations with fractional derivatives