On Spectral Theory of Ordinary Differential Operator Of Fractional Order

dc.contributor.authorLachache, Qamar
dc.contributor.authorToufik, HERAIZ: Supervisor
dc.date.accessioned2024-07-17T12:30:43Z
dc.date.available2024-07-17T12:30:43Z
dc.date.issued2024-06-10
dc.description.abstractFractional analysis is a branch of mathematical analysis which studies the possibility of defining noninteger powers of derivative and integrating operators. we define some useful functions such as Gamma function, Beta function and MittagLeffler function. These functions play a very important role in the theory of fractional order differential calculus. we will present the definition of a fractional derivative and then we study the three most popular approaches to fractional derivatives: the Grünwald-Letnikov, Riemann-Liouville and Caputo approaches as well as their properties. Finally, we study some examples of fractional derivatives. Keywords: Fractional derivation, Grünwald-Letnikov, Riemann-Liouville, Caputo. and operator theory to study the spectral properties (such as eigenvalues and eigenfunctions) of fractional differential operators.
dc.identifier.urihttps://dspace.univ-msila.dz/handle/123456789/43886
dc.language.isoen
dc.publisherMohamed Boudiaf University of M'sila
dc.subjectClosed Operator
dc.subjectspectrum
dc.subjectDifferential of fractional order
dc.titleOn Spectral Theory of Ordinary Differential Operator Of Fractional Order
dc.typeThesis

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