KAM-rigidity for parabolic affine abelian actions

Abstract

We show the following dichotomy for a linear parabolic Z2-action L on the torus with at least one step-2 generator: (i) Any affine Z2-action with linear part L has a Z-factor that is either identity or genuinely parabolic, and is thus not KAM-rigid, or (ii) Almost every affine Z2-action with linear part L is KAM-rigid under volume preserving perturbations.