Singular Schr\"odinger operators with prescribed spectral properties
Abstract
The paper deals with singular Schr\"odinger operators of the form gather* -d2 d x2 + Σk∈Z γk δ(·-zk), γk∈R, gather* in L2(-,+), where (-,+) is a bounded interval, and δ(·-zk) is the Dirac delta-function supported at zk∈ (-,+). It will be shown that the interaction strengths γk and the points zk can be chosen in such a way that the essential spectrum and a bounded part of the discrete spectrum of this self-adjoint operator coincide with prescribed sets on a real line.
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