On Quasiconvex Subsets of Hyperbolic Groups
A geodesic metric space $X$ is called hyperbolic if there exists $delta ge 0$ such that every geodesic triangle $Delta$ in $X$ is $delta$-slim, i.e., each side of $Delta$ is contained in a closed $delta$-neighborhood of the two other sides. Let $G$ be a group generated by a finite set $A$ and let $G...
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Language: | en |
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VANDERBILT
2005
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Online Access: | http://etd.library.vanderbilt.edu/available/etd-04062005-201041/ |