On the Existence of Solutions for a Fractional Finite Difference Inclusion Via Three Points Boundary Conditions
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Date
2015
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Springer
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GOLD
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Abstract
In this paper, we discussed the existence of solutions for the fractional finite difference inclusion Delta(nu)x(t) is an element of F(t, x(t), Delta x(t), Delta(2)x(t)) via the boundary value conditions xi x(nu - 3) + beta Delta x(nu - 3) = 0, x(eta) = 0, and gamma x(b + nu) + delta Delta x(b + nu) = 0, where eta is an element of N-nu-2(b+nu-1), 2 < nu < 3, and F : N-nu-3(b+nu+1) x R x R x R -> 2(R) is a compact valued multifunction.
Description
Keywords
Fixed Point, Fractional Finite Difference Inclusion, Three Points Boundary Conditions, Finite difference, Fractional Differential Equations, Theory and Applications of Fractional Differential Equations, Mathematical analysis, Engineering, Differential equation, FOS: Mathematics, Functional Differential Equations, Boundary value problem, Anomalous Diffusion Modeling and Analysis, Algebra and Number Theory, Inclusion (mineral), Applied Mathematics, Physics, Partial differential equation, Applied mathematics, Fracture Mechanics Modeling and Simulation, Boundary Value Problems, Mechanics of Materials, Boundary (topology), Modeling and Simulation, Physical Sciences, Thermodynamics, Analysis, Mathematics, Ordinary differential equation, Nonlinear boundary value problems for ordinary differential equations, Fractional ordinary differential equations, Fractional derivatives and integrals, Ordinary differential inclusions, three points boundary conditions, fractional finite difference inclusion, fixed point, Discrete version of topics in analysis
Fields of Science
01 natural sciences, 0101 mathematics
Citation
Baleanu, D., Rezapour, S., Salehi, S. (2015). On the existence of solutions for a fractional finite difference inclusion via three points boundary conditions. Advance in Difference Equations. http://dx.doi.org/10.1186/s13662-015-0559-7
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Q1
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OpenCitations Citation Count
7
Source
Advances in Difference Equations
Volume
2015
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7
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2
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