English

Distortion Elements in Group actions on surfaces

Dynamical Systems 2007-05-23 v2

Abstract

If \G\G is a finitely generated group with generators {g1,...,gj}\{g_1,...,g_j\} then an infinite order element f\Gf \in \G is a {\em distortion element} of \G\G provided lim infnfn/n=0,\displaystyle{\liminf_{n \to \infty} |f^n|/n = 0,} where fn|f^n| is the word length of fnf^n in the generators. Let SS be a closed orientable surface and let \Diff(S)0\Diff(S)_0 denote the identity component of the group of C1C^1 diffeomorphisms of SS. Our main result shows that if SS has genus at least two and if ff is a distortion element in some finitely generated subgroup of \Diff(S)0\Diff(S)_0, then \supp(μ)\Fix(f)\supp(\mu) \subset \Fix(f) for every ff-invariant Borel probability measure μ\mu. Related results are proved for S=T2S = T^2 or S2S^2. For μ\mu a Borel probability measure on SS, denote the group of C1C^1 diffeomorphisms that preserve μ\mu by \Diffμ(S)\Diff_{\mu}(S). We give several applications of our main result showing that certain groups, including a large class of higher rank lattices, admit no homomorphisms to \Diffμ(S)\Diff_{\mu}(S) with infinite image.

Keywords

Cite

@article{arxiv.math/0404532,
  title  = {Distortion Elements in Group actions on surfaces},
  author = {John Franks and Michael Handel},
  journal= {arXiv preprint arXiv:math/0404532},
  year   = {2007}
}