How (not) to prove (un)distortion for diffeomorphisms of one-manifolds
Abstract
This article addresses the following general question: Given a one-dimensional manifold M and 1 r < s ∞, does there exist a Cs orientation preserving compactly supported diffeomorphism of M that is undistorted in the group Diffc,+s(M) of such diffeomorphisms while distorted in the bigger group of Cr diffeomorphisms? Interestingly, the answer is known to be positive in the case (r,s)=(1,2) and negative in the case (r,s)=(2,∞), according to arXiv:2004.07055 and arXiv:2507.13770, respectively. The first part of this note originates from a failed attempt to extend the ideas of arXiv:2004.07055 to the case (r,s)=(2,3). More precisely, in regularities C1 and C2, obstructions to distortion are provided by drifts of cocycles for isometric actions of Diffc,+r(M) on Banach spaces for r=1 and r=2 (namely, the logarithmic and projective derivatives f Df and f D Df, respectively). On Diffc,+3(M), the so-called Liouville cocycle is a natural candidate when looking for new obstructions, but we show that its drift vanishes for C2-distorted diffeomorphisms (and this holds more generally for any "similar" cocycle). This does not rule out the existence of C2-distorted diffeomorphisms that are C3-undistorted. However, at least in the case of the real line, such a diffeomorphism should have very low regularity. Indeed, extending the methods and results of arXiv:2507.13770, in the second part of this article, we show that every compactly supported C2-distorted diffeomorphism of the real line is Cr-distorted provided its differentiability class is larger than C2r+2.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.