Abstract
The theme of the development of the theory and applications of
Green's Functions is skilfully used to motivate and connect clear
accounts of the theory of distributions, Fourier series and
transforms, Hilbert spaces, linear integral equations. In this work
we analyze the Green's functions of boundary value problems defined
on two interval and associated with Schrodinger operators with
interaction conditions. We have constructed some special
eigensolutions of this problem and presented a formula and the
existence condition of Green's function in terms of the general
solution of a corresponding homogeneous equation. We have obtained
the relation between two Green's functions of two nonhomogeneous
problems. It allows us to find Green's function for the same
equation but with different additional conditions. These problems
include the cases in which the boundary has two, one or none
vertices. In each case, the Green's functions, the eigenvalues and
the eigenfunctions are given in terms of asymptotic formulas. A
preliminary study of two-point regular boundary value problems with
additional transmission conditions was developed by the authors of
this study under the denomination of two-point transmission
boundary value problems. In each case, it is essential to describe
the solutions of the Schrodinger equation on the interior nodes of
the path. As an consequence of this property, we can characterize
those boundary value problems that are regular and then we obtain
their corresponding Green's function, as well as the eigenvalues and
the eigenfunctions for the regular case.