Nonlocal Cauchy Problem Via a Fractional Operator Involving Power Kernel in Banach Spaces
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Abstract
We investigated existence and uniqueness conditions of solutions of a nonlinear differential equation containing the Caputo-Fabrizio operator in Banach spaces. The mentioned derivative has been proposed by using the exponential decay law and hence it removed the computational complexities arising from the singular kernel functions inherit in the conventional fractional derivatives. The method used in this study is based on the Banach contraction mapping principle. Moreover, we gave a numerical example which shows the applicability of the obtained results.
Description
Keten Copur, Aysegul/0000-0002-7973-946X; Yavuz, Mehmet/0000-0002-3966-6518
Keywords
Existence-Uniqueness Conditions, Nonlocal Cauchy Problem, Caputo-Fabrizio Fractional Derivative, Banach Space, Caputo–Fabrizio Fractional Derivative, QA299.6-433, Banach space, nonlocal Cauchy problem, QA1-939, Thermodynamics, Caputo–Fabrizio fractional derivative, QC310.15-319, existence-uniqueness conditions, Mathematics, Analysis
Fields of Science
0101 mathematics, 01 natural sciences
Citation
Keten, Aysegul; Yavuz, Mehmet; Baleanu, Dumitru, "Nonlocal Cauchy Problem via a Fractional Operator Involving Power Kernel in Banach Spaces", Fractal and Fractional, Vol. 3, No. 2, (June 2019)
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46
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Volume
3
Issue
2
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27
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8
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CrossRef : 47
Scopus : 57
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