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On the profinite distinguishability of hyperbolic Dehn fillings of finite-volume 3-manifolds
Published 20 Feb 2021 in math.AT and math.LO | (2102.10445v2)
Abstract: We use model theory to study relative profinite rigidity of $3$-manifold groups and show that given any residually finite group $\Gamma$ with finite character variety and single-cusped finite volume hyperbolic $3$-manifold $M$, cofinitely many Dehn fillings $M_{p/q}$ are profinitely distinguishable from $\Gamma$.
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