Existence of solutions for a class of boundary value problems involving Riemann Liouville derivative with respect to a function
A. Nouf, Wafa Shammakh, Abdeljabbar Ghanmi
Abstract
In this article, we study some class of fractional boundary value problem involving generalized Riemann Liouville derivative with respect to a function and the p-Laplace operator. Precisely, using variational methods combined with the mountain pass theorem, we prove that such problem has a nontrivial weak solution. Our main result significantly complement and improves some previous papers in the literature.
Topics & Concepts
MathematicsBoundary value problemClass (philosophy)Operator (biology)Derivative (finance)Mathematical analysisPure mathematicsLaplace transformComplement (music)Fractional calculusFunction (biology)Z functionRiemann hypothesisApplied mathematicsRiemann Xi functionRepressorBiologyTranscription factorComplementationBiochemistryArtificial intelligenceEconomicsGeneComputer scienceEvolutionary biologyFinancial economicsChemistryPhenotypeNonlinear Differential Equations AnalysisDifferential Equations and Boundary ProblemsFractional Differential Equations Solutions