Schr\"odinger operators with complex singular potentials

Abstract

We study one-dimensional Schr\"odinger operators S(q) on the space L2(R) with potentials q being complex-valued generalized functions from the negative space Hunif-1(R). Particularly the class Hunif-1(R) contains periodic and almost periodic Hloc-1(R)-functions. We establish an equivalence of the various definitions of the operators S(q), investigate their approximation by operators with smooth potentials from the space Lunif1(R) and prove that the spectrum of each operator S(q) lies within a certain parabola.