Citations:quasisymmetry


 * 2004 Urs Lang & Thilo Schlichenmaier, "Nagata dimension, quasisymmetric embeddings, and Lipschitz extensions" arXiv
 * The Nagata dimension turns out to be a quasisymmetry invariant of metric spaces.
 * 2007 Peter Haïssinsky & Kevin M. Pilgrim, "Thurston obstructions and Ahlfors regular conformal dimension" arXiv
 * Associated to $$f$$ is a canonical quasisymmetry class $$\mathcal G(f)$$ of Ahlfors regular metrics on the sphere in which the dynamics is (non-classically) conformal.
 * 2010 David Radnell & Eric Schippers, "The semigroup of rigged annuli and the Teichmueller space of the annulus" arXiv
 * By extending the parametrizations to quasisymmetries, we show that this semigroup is a quotient of the Teichmueller space of doubly-connected Riemann surfaces by a Z action.