Ascending chains of free groups in 3-manifold groups

Takahasi and Higman independently proved that any ascending chain of subgroups of constant rank in a free group must stabilize. Kapovich and Myasnikov gave a proof of this fact in the language of graphs and Stallings folds. Using profinite techniques, Shusterman extended this ascending chain conditi...

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Bibliographic Details
Published inarXiv.org
Main Authors Bering, Edgar A, Lazarovich, Nir
Format Paper
LanguageEnglish
Published Ithaca Cornell University Library, arXiv.org 17.02.2022
Subjects
Chains
Graphs
Subgroups
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Summary:Takahasi and Higman independently proved that any ascending chain of subgroups of constant rank in a free group must stabilize. Kapovich and Myasnikov gave a proof of this fact in the language of graphs and Stallings folds. Using profinite techniques, Shusterman extended this ascending chain condition to limit groups, which include closed surface groups. Motivated by Kapovich and Myasnikov's proof we provide two new proofs of this ascending chain condition for closed surface groups, and establish the ascending chain condition for free subgroups of constant rank in a closed (or finite-volume hyperbolic) 3-manifold group. Hyperbolic geometry, geometrization, and graphs-of-groups decompositions all play a role in our proofs.
ISSN:2331-8422