Yael Algom-Kfir
Published 2012-02-28, updated 2018-06-21Version 5
We develop the theory of a metric completion of an asymmetric metric space. We characterize the points on the boundary of Outer Space that are in the metric completion of Outer Space with the Lipschitz metric. We prove that the simplicial completion, the subset of the completion consisting of simplicial tree actions, is homeomorphic to the free splitting complex. We use this to give a new proof of a theorem by Francaviglia and Martino that the isometry group of Outer Space is homeomorphic to $\text{Out}(F_n)$ for $n \geq 3$ and equal to $\text{PSL}(2,\mathbb{Z})$ for $n=2$.
Comments: Thoroughly revised version. Section 1 is completely new. Fixed some mistakes in other sections
On the bordification of outer space
Limit sets of unfolding paths in Outer space
The horoboundary of outer space, and growth under random automorphisms
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