Vestnik КRAUNC. Fiz.-Mat. nauki. 2024. vol. 48. no. 3. P. 43 – 55. ISSN 2079-6641

MATHEMATICS
https://doi.org/10.26117/2079-6641-2024-48-3-43-55
Research Article
Full text in Russian
MSC 26A33, 34B05

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Cauchy Problem for Fractional Order Equation with Involution

L. M. Eneeva^{\ast}

Institute of Applied Mathematics and Automation, Kabardino-Balkarian Scientific Center RAS, 360000, Nalchik, Shortanova st., 89 A, Russia

Abstract. The paper considers a linear ordinary differential equation with a fractional derivative that contains an involution operator in the subordinate term. The equation under consideration is a model equation and belongs to the class of differential equations that need to be investigated due to the study of boundary value problems for fractional differential equations containing a composition of left- and righthand fractional differentiation operators. The latter arise when modeling various physical and geophysical processes and, in particular, are of great importance when describing dissipative oscillatory systems. For the equation under consideration, the initial value problem in a unit interval is investigated. The main result of the paper is a theorem of existence and uniqueness of a solution to the problem under consideration. Sufficient conditions that ensure unique solvability of the problem under consideration are formulated in terms of constraints on the coefficient and the right-hand side of the equation under consideration. A fundamental solution is constructed, its various representations are obtained, and its main properties are studied. An explicit representation of the solution to the problem under consideration is found in terms of the fundamental solution.

Key words: fractional equation, Cauchy problem, Riemann-Liouville derivative, involution, fundamental solution.

Received: 01.11.2024; Revised: 08.11.2024; Accepted: 18.11.2024; First online: 20.11.2024

For citation. Eneeva L. M. Cauchy problem for fractional order equation with involution. Vestnik KRAUNC. Fiz.-mat. nauki. 2024, 48: 3, 43-55. EDN: RHKXQA. https://doi.org/10.26117/2079-6641-2024-48-3-43-55.

Funding. The work was carried out within the framework of the state assignment of the IPMA KBSC RAS (reg. No. 122041800015-8).

Competing interests. There are no conflicts of interest regarding authorship and publication.

Contribution and Responsibility. Author is solely responsible for providing the final version of the article in print.

^{\ast}Correspondence: E-mail: eneeva72@list.ru

The content is published under the terms of the Creative Commons Attribution 4.0 International License

© Eneeva L. M., 2024

© Institute of Cosmophysical Research and Radio Wave Propagation, 2024 (original layout, design, compilation)

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Information about the author

Eneeva Liana Magometovna – Ph. D. (Phys. & Math.), Senior Researcher at the Institute of Applied Mathematics and Automation of the Kabardino-Balkarian Scientific Center of the Russian Academy of Sciences, Nalchik, Russia, ORCID 0000-0003-2530-5022