On solution of non-linear FDE under tempered Ψ - Caputo derivative for the first-order and three-point boundary conditions
| dc.contributor.author | Bensassa, K. | |
| dc.contributor.author | Benbachir, M. | |
| dc.contributor.author | Samei, M.E. | |
| dc.contributor.author | Salahshour, S. | |
| dc.date.accessioned | 2025-01-23T05:25:14Z | |
| dc.date.available | 2025-01-23T05:25:14Z | |
| dc.date.issued | 2024 | |
| dc.description.abstract | In this article, the existence and uniqueness of solutions for non-linear fractional differential equation with Tempered Ψ - Caputo derivative with three-point boundary conditions were studied. The existence and uniqueness of the solution were proved by applying the Banach contraction mapping principle and Schaefer’s fixed point theorem. | ru_RU |
| dc.identifier.citation | On solution of non-linear FDE under tempered Ψ - Caputo derivative for the first-order and three-point boundary conditions./ K. Bensassa [et al.] // Bulletin of the Karaganda University. “Mathematics” Series. — 2024. — Vol. 29 - Iss. 4(116). —42-57pp. | ru_RU |
| dc.identifier.issn | 2518-7929 | |
| dc.identifier.uri | https://rep.buketov.edu.kz//handle/data/19534 | |
| dc.language.iso | other | ru_RU |
| dc.publisher | Karagandy University of the name of acad. E.A. Buketov | ru_RU |
| dc.relation.ispartofseries | “Mathematics” Series;4(116) | |
| dc.subject | fractional differential equations | ru_RU |
| dc.subject | tempered Ψ - Caputo derivative | ru_RU |
| dc.subject | nonlinear analysis | ru_RU |
| dc.subject | Schaefer’s fixed point theorem | ru_RU |
| dc.subject | Banach contraction. | ru_RU |
| dc.title | On solution of non-linear FDE under tempered Ψ - Caputo derivative for the first-order and three-point boundary conditions | ru_RU |
| dc.title.alternative | In this article, the existence and uniqueness of solutions for non-linear fractional differential equation with Tempered Ψ-Caputo derivative with three-point boundary conditions were studied. The existence and uniqueness of the solution were proved by applying the Banach contraction mapping principle and Schaefer’s fixed point theorem. | ru_RU |
| dc.type | Article | ru_RU |