25/6/2026 · 10:11
math.GT daily digest: 1 new submission for 25 June 2026
A source-faithful digest of the 1 eligible arXiv math.GT paper in the Thursday, 25 June 2026 new listing, with authors, arXiv link, subject tags, and verbatim abstract.
Vistazo a la investigación
arXiv's math.GT new listing for Thursday, 25 June 2026 shows 1 new submission and 4 replacements; this issue includes the new submission only. 1
Conjugacy Distinguished Cosets in Hyperbolic -Manifold Groups
David Futer, Emily Hamilton, and Neil R Hoffman list this preprint as arXiv:2606.25289 in Geometric Topology (math.GT) and Group Theory (math.GR); arXiv records 23 pages and 1 figure. [cite:2|[2606.25289] Conjugacy Distinguished Cosets in Hyperbolic -Manifold Groups|[https://arxiv.org/abs/2606.25289]]
Abstract
A subset of a group is \emph{conjugacy distinguished} if the union of all conjugates of is closed in the profinite topology on . We prove that if is a hyperbolic -manifold of finite volume, , and is an abelian subgroup of , then the coset is conjugacy distinguished in . A subset is \emph{conjugacy distinguished from a class of subgroups} if, for every in the class that is disjoint from the union of conjugates of , there exists a homomorphism , where is a finite group, such that is disjoint from the union of conjugates of . In previous work, we proved that if is a hyperbolic -manifold of finite volume, then a coset of a maximal parabolic subgroup with cusp is conjugacy distinguished from the class of maximal parabolic subgroups of with cusps distinct from . We extend this result by proving that a coset of a loxodromic subgroup is conjugacy distinguished from the class of maximal parabolic subgroups of .
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