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University of Cambridge > Talks.cam > Geometric Group Theory (GGT) Seminar > Two-generator subgroups of free-by-cyclic groups
Two-generator subgroups of free-by-cyclic groupsAdd to your list(s) Download to your calendar using vCal
If you have a question about this talk, please contact Francesco Fournier-Facio. In general, the classification of finitely generated subgroups of a given group is intractable. Restricting to two-generator subgroups in a geometric setting is an exception. For example, a two-generator subgroup of a right-angled Artin group is either free or free abelian. Jaco and Shalen proved that a two-generator subgroup of the fundamental group of an orientable atoroidal irreducible 3-manifold is either free, free-abelian, or finite-index. In this talk I will present recent work proving a similar classification theorem for two generator mapping-torus groups of free group endomorphisms: every two generator subgroup is either free or conjugate to a sub-mapping-torus group. As an application we obtain an analog of the Jaco-Shalen result for free-by-cyclic groups with fully irreducible atoroidal monodromy. While the statement is algebraic, the proof technique uses the topology of finite graphs, a la Stallings. This is joint work with Naomi Andrew, Ilya Kapovich, and Stefano Vidussi. This talk is part of the Geometric Group Theory (GGT) Seminar series. This talk is included in these lists:
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