On purely loxodromic actions

@article{Kapovich2016OnPL,
  title={On purely loxodromic actions},
  author={Ilya Kapovich},
  journal={Monatshefte f{\"u}r Mathematik},
  year={2016},
  volume={181},
  pages={89-101}
}
  • Ilya Kapovich
  • Published 2016
  • Mathematics
  • Monatshefte für Mathematik
  • We construct an example of an isometric action of F(a, b) on a $$\delta $$δ-hyperbolic graph Y, such that this action is acylindrical, purely loxodromic, has asymptotic translation lengths of nontrivial elements of F(a, b) separated away from 0, has quasiconvex orbits in Y, but such that the orbit map $$F(a,b)\rightarrow Y$$F(a,b)→Y is not a quasi-isometric embedding. 
    Hyperbolic structures on groups
    18

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