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Analysis of positive solution and Hyers‐Ulam stability for a class of singular fractional differential equations with p ‐Laplacian in Banach space
Author(s) -
Khan Hasib,
Chen Wen,
Sun Hongguang
Publication year - 2018
Publication title -
mathematical methods in the applied sciences
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.719
H-Index - 65
eISSN - 1099-1476
pISSN - 0170-4214
DOI - 10.1002/mma.4835
Subject(s) - mathematics , fractional calculus , banach space , operator (biology) , class (philosophy) , mathematical analysis , stability (learning theory) , fixed point theorem , laplace operator , function (biology) , nonlinear system , space (punctuation) , pure mathematics , differential equation , fixed point , biochemistry , chemistry , physics , linguistics , philosophy , repressor , quantum mechanics , artificial intelligence , machine learning , evolutionary biology , biology , computer science , transcription factor , gene
This paper deals with 2 core aspects of fractional calculus including existence of positive solution and Hyers‐Ulam stability for a class of singular fractional differential equations with nonlinear p ‐Laplacian operator in Caputo sense. For these aims, the suggested problem is converted into an integral equation via Green function H ε ( t , s ) , for ε ∈( n −1, n ], where n ≥4. Then, the Green function is examined whether it is increasing or decreasing and positive or negative function. After these properties, some classical fixed‐point theorems are used for the existence of positive solution. Hyers‐Ulam stability of the proposed problem is also considered. For the application of the results, an expressive example is included.