Implicit fractional differential equation with anti-periodic boundary condition involving Caputo-Katugampola type

Saleh S. Redhwan; Sadikali L. Shaikh; Mohammed S. ‬Abdo

doi:10.3934/math.2020240

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Implicit fractional differential equation with anti-periodic boundary condition involving Caputo-Katugampola type

Saleh S. Redhwan Sadikali L. Shaikh Mohammed S. ‬Abdo

Year: 2020 Journal: AIMS Mathematics Vol: 5 (4)Pages: 3714-3730 Publisher: American Institute of Mathematical Sciences

DOI: 10.3934/math.2020240

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Abstract

This paper deals with a nonlinear implicit fractional differential equation with the anti-periodic boundary condition involving the Caputo-Katugampola type. The existence and uniqueness results are established by applying the fixed point theorems of Krasnoselskii and Banach. Further, by using generalized Gronwall inequality the Ulam-Hyers stability results are proved. To demonstrate the effectiveness of the main results, appropriate examples are granted.

Keywords:

Mathematics Uniqueness Fixed-point theorem Boundary value problem Gronwall's inequality Type (biology) Mathematical analysis Nonlinear system Differential equation Stability (learning theory) Banach space Fixed point Applied mathematics Inequality Computer science

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Fractional Differential Equations Solutions

Physical Sciences → Mathematics → Modeling and Simulation

Nonlinear Differential Equations Analysis

Physical Sciences → Mathematics → Applied Mathematics

Differential Equations and Boundary Problems

Physical Sciences → Mathematics → Applied Mathematics

Implicit fractional differential equation with anti-periodic boundary condition involving Caputo-Katugampola type

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