Long-time stability for nonlinear Maryland models

Abstract

For the d-dimensional nonlinear Maryland model equationeq-abs ∂t qn=π(n·+x)qn+ε(Δq)n+|qn|2qn, n∈d, equation with d∈*, ε∈ and ∈d satisfying a suitable Diophantine condition, we establish polynomial long-time stability of polynomially weighted 2-norm \|q(t)\|s:=(Σn∈d|qn|2 (1+|n|2)s)12, s>0. More precisely, given any M*∈*, for phase parameters x belonging to an almost full-measure subset of /, if |ε| is sufficiently small, then solutions q(t) of Eq. (eq-abs) with high-order weighted 2-norm \|q(0)\|s of sufficiently small size satisfy \|q(t)\|s=(), ∀ \ |t|≤ ε-1-M*. The proof relies on a Birkhoff normal form procedure.