Monotonicity Results for Fractional Difference Operators With Discrete Exponential Kernels
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Abstract
We prove that if the Caputo-Fabrizio nabla fractional difference operator ((CFR) (a-1)del(alpha) y)(t) of order 0 < alpha <= 1 and starting at a -1 is positive for t = a, a + 1,..., then y(t) is a-increasing. Conversely, if y(t) is increasing and y(a) >= 0, then ((CFR) (a-1)del(alpha)y)(t) >= 0. A monotonicity result for the Caputo-type fractional difference operator is proved as well. As an application, we prove a fractional difference version of the mean-value theorem and make a comparison to the classical discrete fractional case.
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Abdeljawad, Thabet/0000-0002-8889-3768
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Keywords
Discrete Exponential Kernel, Caputo Fractional Difference, Riemann Fractional Difference, Discrete Fractional Mean Value Theorem, Fractional Differential Equations, Economics, Operator (biology), Theory and Applications of Fractional Differential Equations, Mathematical analysis, Biochemistry, Quantum mechanics, Gene, Differential equation, Nabla symbol, FOS: Mathematics, Biology, Anomalous Diffusion Modeling and Analysis, Order (exchange), BETA (programming language), Algebra and Number Theory, Omega, Ecology, Applied Mathematics, Physics, Exponential function, Fractional calculus, Pure mathematics, Computer science, Nonlocal Partial Differential Equations and Boundary Value Problems, Programming language, Fractional Derivatives, Chemistry, Combinatorics, Modeling and Simulation, FOS: Biological sciences, Physical Sciences, Repressor, Fractional Calculus, Transcription factor, Type (biology), Analysis, Mathematics, Monotonic function, Ordinary differential equation, Finance, discrete fractional mean value theorem, Fractional derivatives and integrals, discrete exponential kernel, Difference operators, Caputo fractional difference, Riemann fractional difference, Discrete version of topics in analysis
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01 natural sciences, 0101 mathematics
Citation
Abdeljawad, Thabet; Baleanu, Dumitru (2017). Monotonicity results for fractional difference operators with discrete exponential kernels, Advances in Difference Equations.
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92
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2017
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1
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