The Bianchi groups are subgroup separable on geometrically finite subgroups
classification
🧮 math.GT
keywords
finitegroupssubgroupsbianchigeometricallyarithmeticcertaincommensurable
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We show that for certain arithmetic groups, geometrically finite subgroups are the intersection of finite index subgroups containing them. Examples are the Bianchi groups and the Seifert-Weber dodecahedral space. In particular, for manifolds commensurable with these groups, immersed incompressible surfaces lift to embeddings in a finite sheeted covering.
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