Uniqueness and Ulam-Hyers-Mittag-Leffler stability results for the delayed fractional multi-terms differential equation involving the $\Phi$--Caputo fractional Derivative

TL;DR

This paper establishes the uniqueness and Ulam-Hyers-Mittag-Leffler stability of solutions for a class of delayed fractional differential equations involving the $\

Contribution

It introduces new stability and uniqueness results for multi-term fractional delay differential equations using the $\

Findings

Proves uniqueness of solutions using Banach contraction principle.

Establishes UHML stability via Gronwall inequalities and Picard operators.

Provides an example confirming theoretical results.

Abstract

The principal aim of the present paper is to establish the uniqueness and Ulam-Hyers Mittag-Leffler (UHML) stability of solutions for a new class of multi-terms fractional time-delay differential equations in the context of the $\Phi$-Caputo fractional derivative. To achieve this purpose, the generalized Laplace transform method alongside facet with properties of the Mittag-Leffler functions (M-LFs), are utilized to give a new representation formula of the solutions for the aforementioned problem. Besides that, the uniqueness of the solutions of the considered problem is also proved by applying the well-known Banach contraction principle coupled with the $\Phi$-fractional Bielecki-type norm. While the $\Phi$-fractional Gronwall type inequality and the Picard operator (PO) technique combined with abstract Gronwall lemma are used to prove the UHML stability results for the proposed problem. Lastly, an example is offered to assure the validity of the obtained theoretical results.