Atoroidal mathematics , an atoroidal 3-manifold is one that does not contain an essential torus .variations in this terminology: an essential torus may be defined geometrically , as an embedded , non-boundary parallel , incompressible torus, or it may be defined algebraically, as a subgroup of its fundamental group that is not conjugate to a peripheral subgroup . The terminology is not standardized , and different authors require atoroidal 3-manifolds to satisfy certain additional restrictions . For instance:toroidal .
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