A Fractional Finite Difference Inclusion
No Thumbnail Available
Date
2016
Journal Title
Journal ISSN
Volume Title
Publisher
Eudoxus Press, Llc
Open Access Color
OpenAIRE Downloads
OpenAIRE Views
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.
Description
Keywords
Fixed Point Of Multifunction, Fractional Finite Difference Inclusion, Hausdorff Metric
Turkish CoHE Thesis Center URL
Fields of Science
Citation
Baleanu, D., Rezapour, S., Salehi, S. (2016). A fractional finite difference inclusion. Journal of Computational Analysis and Applications, 20(5), 834-842.
WoS Q
Scopus Q
Q4
Source
Volume
20
Issue
5
Start Page
834
End Page
842
Google Scholar™
Sustainable Development Goals
2
ZERO HUNGER
3
GOOD HEALTH AND WELL-BEING
7
AFFORDABLE AND CLEAN ENERGY
8
DECENT WORK AND ECONOMIC GROWTH
9
INDUSTRY, INNOVATION AND INFRASTRUCTURE
10
REDUCED INEQUALITIES
11
SUSTAINABLE CITIES AND COMMUNITIES
