Spectral gaps of the Hill--Schr\"odinger operators with distributional potentials
Abstract
The paper studies the Hill--Schr\"odinger operators with potentials in the space Hω ⊂ H-1(T, R). The main results completely describe the sequences arising as the lengths of spectral gaps of these operators. The space Hω coincides with the H\"ormander space Hω2(T, R) with the weight function ω(1+2) if ω belongs to Avakumovich's class OR. In particular, if the functions ω are power, then these spaces coincide with the Sobolev spaces. The functions ω may be nonmonotonic.
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