Litcius/Paper detail

Ψ-Bielecki-type norm inequalities for a generalized Sturm–Liouville–Langevin differential equation involving Ψ-Caputo fractional derivative

Hacen Serrai, Brahim Tellab, Sina Etemad, İbrahim Avcı, Shahram Rezapour

2024Boundary Value Problems16 citationsDOIOpen Access PDF

Abstract

Abstract The present research work investigates some new results for a fractional generalized Sturm–Liouville–Langevin (FGSLL) equation involving the Ψ -Caputo fractional derivative with a modified argument. We prove the uniqueness of the solution using the Banach contraction principle endowed with a norm of the Ψ -Bielecki-type. Meanwhile, the fixed-point theorems of the Leray–Schauder and Krasnoselskii type associated with the Ψ -Bielecki-type norm are used to derive the existence properties by removing some strong conditions. We use the generalized Gronwall-type inequality to discuss Ulam–Hyers (), generalized Ulam–Hyers (), Ulam–Hyers–Rassias (), and generalized Ulam–Hyers–Rassias () stability of these solutions. Lastly, three examples are provided to show the effectiveness of our main results for different cases of (FGSLL)-problem such as Caputo-type Sturm–Liouville, Caputo-type Langevin, Caputo–Erdélyi–Kober-type Langevin problems.

Topics & Concepts

MathematicsOrdinary differential equationNorm (philosophy)Partial differential equationMathematical analysisDerivative (finance)Langevin equationFractional calculusType (biology)Differential equationSturm–Liouville theoryApplied mathematicsBoundary value problemPhysicsStatistical physicsFinancial economicsPolitical scienceLawEconomicsBiologyEcologyNonlinear Differential Equations AnalysisSpectral Theory in Mathematical PhysicsFractional Differential Equations Solutions