Quantum Lattice Wave Guides with Randomness -- Localisation and Delocalisation

Abstract

In this paper we consider Schr\"odinger operators on M × Zd2, with M=\M1, …, M2\d1 (`quantum wave guides') with a `-trimmed' random potential, namely a potential which vanishes outside a subset which is periodic with respect to a sub lattice. We prove that (under appropriate assumptions) for strong disorder these operators have pure point spectrum outside the set 0=σ(H0,c) where H0,c is the free (discrete) Laplacian on the complement c of . We also prove that the operators have some absolutely continuous spectrum in an energy region E⊂0. Consequently, there is a mobility edge for such models. We also consider the case -M1=M2=∞, i.~e.~ -trimmed operators on Zd=Zd1×Zd2. Again, we prove localisation outside 0 by showing exponential decay of the Green function GE+iη(x,y) uniformly in η>0 . For all energies E∈E we prove that the Green's function GE+iη is not (uniformly) in 1 as η approaches 0. This implies that neither the fractional moment method nor multi scale analysis can be applied here.