Existence for Time-Fractional Semilinear Diffusion Equation on the Sphere | Zendy

Nguyen Duc Phuong | Zendy; Ho Duy Binh | Zendy; Ho Thi Kim Van | Zendy; Le Dinh Long | Zendy

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Existence for Time-Fractional Semilinear Diffusion Equation on the Sphere

Author(s) -

Nguyen Duc Phuong,

Ho Duy Binh,

Ho Thi Kim Van,

Le Dinh Long

Publication year - 2021

Publication title -

advances in mathematical physics

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.283

H-Index - 23

eISSN - 1687-9139

pISSN - 1687-9120

DOI - 10.1155/2021/6370636

Subject(s) - diffusion , mathematics , focus (optics) , order (exchange) , fixed point theorem , value (mathematics) , initial value problem , banach fixed point theorem , point (geometry) , fractional calculus , mathematical analysis , banach space , physics , geometry , statistics , economics , optics , thermodynamics , finance

Fractional diffusion on the sphere plays a large role in the study of physical phenomena customs and meteorology and geophysics. In this paper, we examine two types of the sphere problem: the initial value problem and the end value problem. We are interested in focus on the solution existence in a local or global form. In order to overcome difficult evaluations when evaluating, we need some new techniques. The main analytical tool is the use of the Banach fixed point theorem.

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