Sharp spectral transition for eigenvalues embedded into the spectral bands of perturbed periodic operators

Abstract

In this paper, we consider the Schr\"odinger equation, equation* Hu=-u+(V(x)+V0(x))u=Eu, equation* where V0(x) is 1-periodic and V (x) is a decaying perturbation. By Floquet theory, the spectrum of H0=-∇2+V0 is purely absolutely continuous and consists of a union of closed intervals (often referred to as spectral bands). Given any finite set of points \ Ej\j=1N in any spectral band of H0 obeying a mild non-resonance condition, we construct smooth functions V(x)=O(1)1+|x| such that H=H0+V has eigenvalues \ Ej\j=1N. Given any countable set of points \ Ej\ in any spectral band of H0 obeying the same non-resonance condition, and any function h(x)>0 going to infinity arbitrarily slowly, we construct smooth functions |V(x)|≤ h(x)1+|x| such that H=H0+V has eigenvalues \ Ej\. On the other hand, we show that there is no eigenvalue of H=H0+V embedded in the spectral bands if V(x)=o(1)1+|x| as x goes to infinity. We prove also an analogous result for Jacobi operators.