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The Existence of Solutions for w-Weighted ψ-Hilfer Fractional Differential Inclusions of Order μ ∈ (1, 2) with Non-Instantaneous Impulses in Banach Spaces

Zainab Alsheekhhussain, Ahmed Gamal Ibrahim, Mohammed Mossa Al-Sawalha, Yousef Jawarneh

2024Fractal and Fractional10 citationsDOIOpen Access PDF

Abstract

In this research, we obtain the sufficient conditions that guarantee that the set of solutions for an impulsive fractional differential inclusion involving a w-weighted ψ-Hilfer fractional derivative, D0,tσ,v,ψ,w,of order μ∈(1,2), in infinite dimensional Banach spaces that are not empty and compact. We demonstrate the exact relation between a differential equation involving D0,tσ,v,ψ,w of order μ ∈(1,2) in the presence of non-instantaneous impulses and its corresponding fractional integral equation. Then, we derive the formula for the solution for the considered problem. The desired results are achieved using the properties of the w-weighted ψ-Hilfer fractional derivative and appropriate fixed-point theorems for multivalued functions. Since the operator D0,tσ,v,ψ,w includes many types of well-known fractional differential operators, our results generalize several results recently published in the literature. We give an example that illustrates and supports our theoretical results.

Topics & Concepts

MathematicsFractional calculusBanach spaceOrder (exchange)Mathematical analysisPure mathematicsDifferential inclusionFixed-point theoremOperator (biology)Differential equationFixed pointDerivative (finance)BiochemistryEconomicsTranscription factorChemistryFinanceFinancial economicsRepressorGeneNonlinear Differential Equations AnalysisFractional Differential Equations SolutionsFixed Point Theorems Analysis
The Existence of Solutions for w-Weighted ψ-Hilfer Fractional Differential Inclusions of Order μ ∈ (1, 2) with Non-Instantaneous Impulses in Banach Spaces | Litcius