Open AccessExtremal Solutions for Caputo Conformable Differential Equations with p-Laplacian Operator and Integral Boundary Condition
Author(s) -
Zhongqi Peng,
Yuan Li,
Qi Zhang,
Yimin Xue
Publication year - 2021
Publication title -
complexity
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.447
H-Index - 61
eISSN - 1099-0526
pISSN - 1076-2787
DOI - 10.1155/2021/1097505
Subject(s) - conformable matrix , mathematics , uniqueness , nonlinear system , monotone polygon , operator (biology) , fixed point theorem , type (biology) , boundary value problem , mathematical analysis , laplace operator , pure mathematics , ecology , biochemistry , chemistry , physics , geometry , repressor , quantum mechanics , biology , transcription factor , gene
The Caputo conformable derivative is a new Caputo-type fractional differential operator generated by conformable derivatives. In this paper, using Banach fixed point theorem, we obtain the uniqueness of the solution of nonlinear and linear Cauchy problem with the conformable derivatives in the Caputo setting, respectively. We also establish two comparison principles and prove the extremal solutions for nonlinear fractional p -Laplacian differential system with Caputo conformable derivatives by utilizing the monotone iterative technique. An example is given to verify the validity of the results.
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