Fractional discrete-time diffusion equation with uncertainty: Applications of fuzzy discrete fractional calculus
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Date
2018
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Elsevier Science Bv
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Abstract
This study provides some basics of fuzzy discrete fractional calculus as well as applications to fuzzy fractional discrete-time equations. With theories of r-cut set, fuzzy Caputo and Riemann-Liouville fractional differences are defined on a isolated time scale. Discrete Leibniz integral law is given by use of w-monotonicity conditions. Furthermore, equivalent fractional sum equations are established. Fuzzy discrete Mittag-Leffler functions are obtained by the Picard approximation. Finally, fractional discrete-time diffusion equations with uncertainty is investigated and exact solutions are expressed in form of two kinds of fuzzy discrete Mittag-Leffler functions. This paper suggests a discrete time tool for modeling discrete fractional systems with uncertainty. (C) 2018 Elsevier B.V. All rights reserved.
Description
Huang, Lan-Lan/0000-0002-6375-9183; Wu, Guo-Cheng/0000-0002-1946-6770
Keywords
Fractional Difference Equations, Fuzzy-Valued Functions, Time Scale
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Citation
Huang, Lan-Lan...et al. (2018). "Fractional discrete-time diffusion equation with uncertainty: Applications of fuzzy discrete fractional calculus", Physica a-Statistical Mechanics and its Applications, Vol. 508, pp. 166-175.
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N/A
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Q1
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Volume
508
Issue
Start Page
166
End Page
175