Invariant tori for area-preserving maps with ultra-differentiable perturbation and Liouvillean frequency

Abstract

We prove the existence of invariant tori to the area-preserving maps defined on R2×T equation* x=F(x,θ), θ=θ+α\, \,(α∈ R), equation* where F is closed to a linear rotation, and the perturbation is ultra-differentiable in θ∈ T, which is very closed to C∞ regularity. Moreover, we assume that the frequency α is any irrational number without other arithmetic conditions and the smallness of the perturbation does not depend on α. Thus, both the difficulties from the ultra-differentiability of the perturbation and Liouvillean frequency will appear in this work. The proof of the main result is based on the Kolmogorov-Arnold-Moser (KAM) scheme about the area-preserving maps with some new techniques.