Monotonicity results for fractional difference operators with discrete exponential kernels
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Date
2017
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Springer International Publishing AG
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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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Discrete Exponential Kernel, Caputo Fractional Difference, Riemann Fractional Difference, Discrete Fractional Mean Value Theorem
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Abdeljawad, Thabet; Baleanu, Dumitru (2017). Monotonicity results for fractional difference operators with discrete exponential kernels, Advances in Difference Equations.
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Advances in Difference Equations