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Green's function for higher-order boundary value problems involving a nabla Caputo fractional operator

Published 10 Oct 2018 in math.CA | (1810.04628v1)

Abstract: We consider the discrete, fractional operator $\left(L_a\nu x\right) (t) := \nabla [p(t) \nabla_{a*}\nu x(t)] + q(t) x(t-1)$ involving the nabla Caputo fractional difference, which can be thought of as an analogue to the self-adjoint differential operator. We show that solutions to difference equations involving this operator have expected properties, such as the form of solutions to homogeneous and nonhomogeneous equations. We also give a variation of constants formula via a Cauchy function in order to solve initial value problems involving $L_a\nu$. We also consider boundary value problems of any fractional order involving $L_a\nu$. We solve these BVPs by giving a definition of a Green's function along with a corresponding Green's Theorem. Finally, we consider a (2,1) conjugate BVP as a special case of the more general Green's function definition.

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