Some Properties of Solutions to Multiterm Fractional Boundary Value Problems with  p -Laplacian Operator | Zendy

KumSong Jong | Zendy; HuiChol Choi | Zendy; KyongJun Jang | Zendy; SongGuk Jong | Zendy; Kyongson Jon | Zendy; Ok Ri | Zendy

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Some Properties of Solutions to Multiterm Fractional Boundary Value Problems with

p

-Laplacian Operator

Author(s) -

KumSong Jong,

HuiChol Choi,

KyongJun Jang,

SongGuk Jong,

Kyongson Jon,

Ok Ri

Publication year - 2021

Publication title -

journal of function spaces

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.579

H-Index - 28

eISSN - 2314-8896

pISSN - 2314-8888

DOI - 10.1155/2021/7527306

Subject(s) - uniqueness , mathematics , operator (biology) , boundary value problem , laplace operator , mathematical analysis , biochemistry , chemistry , repressor , transcription factor , gene

In this paper, we study some properties of positive solutions to a class of multipoint boundary value problems for nonlinear multiterm fractional differential equations with p -Laplacian operator. Using the Banach contraction mapping principle, the existence, the uniqueness, the positivity, and the continuous dependency on m -point boundary conditions of the solutions to the given problem are investigated. Also, two examples are presented to demonstrate our main results.

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