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Existence theory and generalized Mittag-Leffler stability for a nonlinear Caputo-Hadamard FIVP via the Lyapunov methodopen access

Authors
Belbali, HadjerBenbachir, MaamarEtemad, SinaPark, ChoonkilRezapour, Shahram
Issue Date
Jun-2022
Publisher
AMER INST MATHEMATICAL SCIENCES-AIMS
Keywords
Caputo-Hadamard derivative; Lyapunov direct method; IC-class function; fixed point; Mittag-Leffler stability
Citation
AIMS MATHEMATICS, v.7, no.8, pp 14419 - 14433
Pages
15
Indexed
SCIE
SCOPUS
Journal Title
AIMS MATHEMATICS
Volume
7
Number
8
Start Page
14419
End Page
14433
URI
https://scholarworks.bwise.kr/hanyang/handle/2021.sw.hanyang/203166
DOI
10.3934/math.2022794
ISSN
2473-6988
2473-6988
Abstract
This paper discusses the existence, uniqueness and stability of solutions for a nonlinear fractional differential system consisting of a nonlinear Caputo-Hadamard fractional initial value problem (FIVP). By using some properties of the modified Laplace transform, we derive an equivalent Hadamard integral equation with respect to one-parametric and two-parametric MittagLeffer functions. The Banach contraction principle is used to give the existence of the corresponding solution and its uniqueness. Then, based on a Lyapunov-like function and a IC-class function, the generalized Mittag-Leffler stability is discussed to solve a nonlinear Caputo-Hadamard FIVP. The findings are validated by giving an example.
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