Existence and Stability Analysis of Solution for Mathieu Fractional Differential Equations with Applications on Some Physical Phenomena

N. Tabouche; A. Berhail; M. M. Matar; J. Alzabut; A. G. M. Selvam; D. Vignesh

doi:10.1007/s40995-021-01076-6

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Journal article

Existence and Stability Analysis of Solution for Mathieu Fractional Differential Equations with Applications on Some Physical Phenomena

N. Tabouche, A. Berhail, M. M. Matar, J. Alzabut, A. G. M. Selvam and D. Vignesh

Iranian journal of science and technology. Transaction A, Science, Vol.45(3), pp.973-982

01/06/2021

DOI: https://doi.org/10.1007/s40995-021-01076-6

Abstract

Multidisciplinary Sciences

Science & Technology

Science & Technology - Other Topics

This paper deals with a class of nonlinear Mathieu fractional differential equations. The reported results discuss the existence, uniqueness and stability for the solution of proposed equation. We prove the main results by the aid of fixed point theorems and Ulam's approach. The paper is appended with two applications that describe the force of periodic pendulum and the motion of a particle in the plane. Graphical representations are used to illustrate the results.

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Title: Existence and Stability Analysis of Solution for Mathieu Fractional Differential Equations with Applications on Some Physical Phenomena
Creators - without role: N. Tabouche - University of Guelma
A. Berhail - University of Guelma
M. M. Matar - Al-Azhar University – Gaza
J. Alzabut - Prince Sultan University
A. G. M. Selvam - Sacred Heart College
D. Vignesh - Sacred Heart College
Publication Details: Iranian journal of science and technology. Transaction A, Science, Vol.45(3), pp.973-982
Publisher: SPRINGER INT PUBL AG
Number of pages: 10
Grant note: RGDES-2017-01-17 / Prince Sultan University
Identifiers: 9926901808331
Academic Unit: Prince Sultan University
Language: English
Resource Type: Journal article