Foundations (Oct 2022)

Green’s Functions for a Fractional Boundary Value Problem with Three Terms

  • Paul W. Eloe,
  • Jeffrey T. Neugebauer

DOI
https://doi.org/10.3390/foundations2040060
Journal volume & issue
Vol. 2, no. 4
pp. 885 – 897

Abstract

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We construct a Green’s function for the three-term fractional differential equation −D0+αu+aD0+μu+f(t)u=h(t), 0tb, where α∈(2,3], μ∈(1,2], and f is continuous, satisfying the boundary conditions u(0)=u′(0)=0, D0+βu(b)=0, where β∈[0,2]. To accomplish this, we first construct a Green’s function for the two-term problem −D0+αu+aD0+μu=h(t), 0tb, satisfying the same boundary conditions. A lemma from spectral theory is integral to our construction. Some limiting properties of the Green’s function for the two-term problem are also studied. Finally, existence results are given for a nonlinear problem.

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