On simultaneous linearization of certain commuting nearly integrable diffeomorphisms of the cylinder

Abstract

Let F and K be commuting C∞ diffeomorphisms of the cylinder T×R that are, respectively, close to F0 (x, y)=(x+ω(y), y) and Tα (x, y)=(x+α, y), where ω(y) is non-degenerate and α is Diophantine. Using the KAM iterative scheme for the group action we show that F and K are simultaneously C∞-linearizable if F has the intersection property (including the exact symplectic maps) and K satisfies a semi-conjugacy condition. We also provide examples showing necessity of these conditions. As a consequence, we get local rigidity of certain class of Z2-actions on the cylinder, generated by commuting twist maps.

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