Hyperbolic Immersions of Free Groups
Abstract
We prove that the mapping torus of a graph immersion has a word-hyperbolic fundamental group if and only if the corresponding endomorphism does not produce Baumslag-Solitar subgroups. Due to a result by Reynolds, this theorem applies to all injective endomorphisms of F2 and nonsurjective fully irreducible endomorphisms of Fn. We also give a framework for extending the theorem to all injective endomorphisms of Fn.
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