Ballistic Behavior for Random Schr\"odinger Operators on the Bethe Strip

Abstract

The Bethe Strip of width m is the cartesian product ×\1,...,m\, where is the Bethe lattice (Cayley tree). We consider Anderson-like Hamiltonians Hλ=12 1 + 1 A+λ on a Bethe strip with connectivity K ≥ 2, where A is an m× m symmetric matrix, is a random matrix potential, and λ is the disorder parameter. Under certain conditions on A and K, for which we previously proved the existence of absolutely continuous spectrum for small λ, we now obtain ballistic behavior for the spreading of wave packets evolving under Hλ for small λ.