Fractional Proportional Differences With Memory
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Date
2017
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Springer Heidelberg
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Abstract
In this paper, we formulate nabla fractional sums and differences and the discrete Laplace transform on the time scale hZ. Based on a local type h-proportional difference (without memory), we generate new types of fractional sums and differences with memory in two parameters which are generalizations to the formulated fractional sums and differences. The kernel of the newly defined generalized fractional sum and difference operators contain h-discrete exponential functions. The discrete h-Laplace transform and its convolution theorem are then used to study the newly introduced discrete fractional operators and also used to solve Cauchy linear fractional difference type problems with step 0 < h <= 1.
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Jarad, Fahd/0000-0002-3303-0623; Abdeljawad, Thabet/0000-0002-8889-3768; Alzabut, Prof. Dr. Jehad/0000-0002-5262-1138
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Citation
Jarad, Fahd; Abdeljawad, Thabet; Alzabut, Jehad, "Fractional proportional differences with memory", European Physical Journal-Special Topics, Vol. 226, No. 16-18, pp. 3333-3354, (2017).
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Q2
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Q2
OpenCitations Citation Count
42
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Volume
226
Issue
16-18
Start Page
3333
End Page
3354
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CrossRef : 42
Scopus : 49
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