A Fractional Finite Difference Inclusion
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Abstract
In this manuscript we investigated the fractional finite difference inclusion Delta(mu)(mu-2) x(t) is an element of F(t, x(t), Delta x(t)) via the boundary conditions Delta x(b + mu) = A and x(mu - 2) = B, where 1 <= 2, A,B is an element of R and F :N-mu-2(b+mu+2) x R -> 2(R) is a compact valued multifunction.
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Fixed Point Of Multifunction, Fractional Finite Difference Inclusion, Hausdorff Metric
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Baleanu, D., Rezapour, S., Salehi, S. (2016). A fractional finite difference inclusion. Journal of Computational Analysis and Applications, 20(5), 834-842.
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20
Issue
5
Start Page
834
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842
Web of Science™ Citations
5
checked on Jun 24, 2026
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1
checked on Jun 24, 2026
