(Arc-)connectedness for the space of Zd-actions by C2 diffeomorphisms on 1-dimensional manifolds

Abstract

We deal with the general problem of connectedness for the space of Zd actions by (orientation-preserving) diffeomorphisms of a compact 1-manifold. We prove two results. First, the space of Zd actions by C2 diffeomorphisms of the interval is connected. Second, any two Zd actions by C2 diffeomorphisms of a compact 1-manifold are connected by a continuous path of C1+ac actions (where C1+ac stands for diffeomorphisms with absolutely continuous derivative). The latter is the first result of arc-connectedness in regularity larger than C1 in this setting. Actually, our proof applies to all Zd actions by C1+ac diffeomorphisms without elements with hyperbolic periodic points; the only obstruction to extend it to the general C1+ac framework comes from the failure of the Sternberg-Yoccoz linearization theorem in class C1+ac.