Vestnik KRAUNC: Fiziko-Matematičeskie Nauki (Dec 2015)

BOUNDARY VALUE PROBLEM FOR DIFFERENTIAL EQUATION WITH FRACTIONAL ORDER DERIVATIVES WITH DIFFERENT ORIGINS

  • L.M. Eneeva

DOI
https://doi.org/10.18454/2079-6641-2015-11-2-39-44
Journal volume & issue
no. 2(11)
pp. 39 – 44

Abstract

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We study a spectral problem for an ordinary differential equation with composition of fractional order differentiation operators in Riemann-Liouville and Caputo senses with different origins. We prove that for the problem under study there exist infinite sequences of eigenvalues and eigenfunctions. All of the eigenvalues are real and positive, and the eigenfunctions form an orthogonal basis in L2(0;1).

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