On the spectrum of the Kronig-Penney model in a constant electric field

Abstract

We are interested in the nature of the spectrum of the one-dimensional Schr\"odinger operator - d2dx2-Fx + Σn ∈ Zgn δ(x-n) L2(R) with F>0 and two different choices of the coupling constants \gn\n∈ Z. In the first model gn λ and we prove that if F∈ π2 Q then the spectrum is R and is furthermore absolutely continuous away from an explicit discrete set of points. In the second model the gn are independent random variables with mean zero and variance λ2. Under certain assumptions on the distribution of these random variables we prove that almost surely the spectrum is R and it is dense pure point if F < λ2/2 and purely singular continuous if F> λ2/2.