Maximal pseudometrics and distortion of circle diffeomorphisms

Abstract

We initiate a study of distortion elements in the Polish groups Diff+k(S1) (1≤ k<∞), as well as Diff+1+AC(S1), in terms of maximal metrics on these groups. We classify distortion in the k=1 case: a C1 circle diffeomorphism is C1-undistorted if and only if it has a hyperbolic periodic point. On the other hand, answering a question of Navas, we exhibit analytic circle diffeomorphisms with only non-hyperbolic fixed points which are C1+AC-undistorted, and hence Ck-undistorted for all k≥ 2. In the appendix, we exhibit a maximal metric on Diff+1+AC(S1), and observe that this group is quasi-isometric to a hyperplane of L1(I).