Author:
Benhiouna Salah,Bellour Azzeddine,Amiar Rachida
Abstract
PurposeA generalization of Ascoli–Arzelá theorem in Banach spaces is established. Schauder's fixed point theorem is used to prove the existence of a solution for a boundary value problem of higher order. The authors’ results are obtained under, rather, general assumptions.Design/methodology/approachFirst, a generalization of Ascoli–Arzelá theorem in Banach spaces in Cn is established. Second, this new generalization with Schauder's fixed point theorem to prove the existence of a solution for a boundary value problem of higher order is used. Finally, an illustrated example is given.FindingsThere is no funding.Originality/valueIn this work, a new generalization of Ascoli–Arzelá theorem in Banach spaces in Cn is established. To the best of the authors’ knowledge, Ascoli–Arzelá theorem is given only in Banach spaces of continuous functions. In the second part, this new generalization with Schauder's fixed point theorem is used to prove the existence of a solution for a boundary value problem of higher order, where the derivatives appear in the non-linear terms.
Reference14 articles.
1. Existence of positive solutions for non-positive higher-order BVPs;J Comput Appl Math,1998
2. Nonlinear neutral delay differential equations of fourth-order: oscillation of solutions;Entropy,2021
3. Positive solutions for singular higher order nonlinear equations;Diff Eqs Dyn Sys,1994
4. Positive solutions for higher ordinary differential equations;Electr J Differ Equ,1995
5. Positive solutions of a nonlinear nth order BVP with nonlocal conditions;Appl Math Lett,2005