Browsing by Author "Khan, Aziz"
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Item Existence of solutions by fixed point theorem of general delay fractional differential equation with p-Laplacian operator(American Institute of Mathematical Sciences, 2023-02-27T00:00:00) Kaushik, Kirti; Kumar, Anoop; Khan, Aziz; Abdeljawad, ThabetIn this manuscript, the main objective is to analyze the existence, uniqueness,(EU) and stability of positive solution for a general class of non-linear fractional differential equation (FDE) with fractional differential and fractional integral boundary conditions utilizing ?p-Laplacian operator. To continue, we will apply Green�s function to determine the suggested FDE�s equivalent integral form. The Guo-Krasnosel�skii fixed point theorem and the properties of the p-Laplacian operator are utilized to derive the existence results. Hyers-Ulam (HU) stability is additionally evaluated. Further, an application is presented to validate the effectiveness of the result. � 2023 the Author(s), licensee AIMS Press.Item Mild solutions of coupled hybrid fractional order system with caputo-hadamard derivatives(World Scientific, 2021-05-15T00:00:00) Bedi, Pallavi; Kumar, Anoop; Abdeljawad, Thabet; Khan, Aziz; G�mez-Aguilar, J.F.This paper is devoted to prove the existence of mild solutions of coupled hybrid fractional order system with Caputo-Hadamard derivatives using Dhage fixed point theorem in Banach algebras. In order to confirm the applicability of obtained result an example is also presented. � 2021 World Scientific Publishing Company.Item Stability analysis of neutral delay fractional differential equations with Erdelyi�Kober fractional integral boundary conditions(Elsevier B.V., 2023-08-11T00:00:00) Bedi, Pallavi; Kumar, Anoop; Khan, Aziz; Abdeljawad, ThabetThe primary focus of this article is to provide sufficient conditions for the Ulam�Hyers stability of neutral delay fractional differential equations involving Hilfer fractional derivatives and Erdelyi�Kober fractional integral boundary conditions. The fixed point approach is utilized to prove the existence and uniqueness of mild solutions for the proposed problem. In the end, the derived results are validated through an illustrative example. � 2023 The Author(s)