Existence, uniqueness, approximation of solutions and $\mathbb E_{\alpha}$--Ulam stability results for a class of nonlinear fractional differential equations involving $\psi$--Caputo derivative with initial conditions
Mathematica Moravica, Tome 25 (2021) no. 1.
Voir la notice de l'article dans eLibrary of Mathematical Institute of the Serbian Academy of Sciences and Arts
The main purpose of this paper is to study the existence, uniqueness, $\mathbb E_{\alpha}$--Ulam stability results, and other properties of solutions for certain classes of nonlinear fractional differential equations involving the $\psi$--Caputo derivative with initial conditions. Modern tools of functional analysis are applied to obtain the main results. More precisely using Weissinger's fixed point theorem and Schaefer's fixed point theorem the existence and uniqueness results of solutions are proven in the bounded domain. While the well known Banach fixed point theorem coupled with Bielecki type norm are used with the end goal to establish sufficient conditions for existence and uniqueness results on unbounded domains. Meanwhile, the monotone iterative technique combined with the method of upper and lower solutions is used to prove the existence and uniqueness of extremal solutions. Furthermore, by means of new generalizations of Gronwall's inequality, different kinds of $\mathbb E_{\alpha}$--Ulam stability of the proposed problem are studied. Finally, as applications of the theoretical results, some examples are given to illustrate the feasibility and correctness of the main results.
Mots-clés :
$\psi $--Caputo fractional derivative, fixed point, existence, uniqueness, extremal solutions, $\mathbb E_{\alpha}$--Ulam stability, Bielecki norm, monotone iterative technique, upper and lower solutions.
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author = {Choukri Derbazi and Zidane Baitiche and Mouffak Benchohra and Gaston N and Gu\'er\'ekata},
title = {Existence, uniqueness, approximation of solutions and $\mathbb E_{\alpha}${--Ulam} stability results for a class of nonlinear fractional differential equations involving $\psi${--Caputo} derivative with initial conditions},
journal = {Mathematica Moravica},
pages = {1 - 30},
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volume = {25},
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year = {2021},
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Choukri Derbazi; Zidane Baitiche; Mouffak Benchohra; Gaston N; Guérékata. Existence, uniqueness, approximation of solutions and $\mathbb E_{\alpha}$--Ulam stability results for a class of nonlinear fractional differential equations involving $\psi$--Caputo derivative with initial conditions. Mathematica Moravica, Tome 25 (2021) no. 1. https://geodesic-test.mathdoc.fr/item/MM3_2021_25_1_a0/