Anderson localized states for the nonlinear Maryland model on Zd

Abstract

In this paper, we investigate Anderson localization for a nonlinear perturbation of the Maryland model H=+π(θ+j·α)δj,j' on Zd. Specifically, if ,δ are sufficiently small, we construct a large number of time quasi-periodic and space exponentially decaying solutions (i.e., Anderson localized states) for the equation i∂ u∂ t=Hu+δ|u|2pu with a Diophantine α. Our proof combines eigenvalue estimates of the Maryland model with the Craig-Wayne-Bourgain method, which originates from KAM theory for Hamiltonian PDEs.

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