Schr\"odinger equation with finitely many δ-interactions: closed form, integral and series representations for solutions

Abstract

A closed form solution for the one-dimensional Schr\"odinger equation with a finite number of δ-interactions \[ Lq,INy:=-y+( q(x)+Σ k=1Nαkδ(x-xk)) y=λ y,0<x<b,\;λ ∈C% \] is presented in terms of the solution of the unperturbed equation \[ Lqy:=-y+q(x)y=λ y,0<x<b,\;λ ∈C% \] and a corresponding transmutation operator TINf is obtained in the form of a Volterra integral operator. With the aid of the spectral parameter power series method, a practical construction of the image of the transmutation operator on a dense set is presented, and it is proved that the operator TINf transmutes the second derivative into the Schr\"odinger operator Lq,IN on a Sobolev space H2. A Fourier-Legendre series representation for the integral transmutation kernel is developed, from which a new representation for the solutions and their derivatives, in the form of a Neumann series of Bessel functions, is derived.