About: Spherical 3-manifold

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In mathematics, a spherical 3-manifold M is a 3-manifold of the form where is a finite subgroup of SO(4) acting freely by rotations on the 3-sphere . All such manifolds are prime, orientable, and closed. Spherical 3-manifolds are sometimes called elliptic 3-manifolds or Clifford-Klein manifolds.

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dbo:abstract	En matemáticas, un espacio esférico tridimensional o 3-variedad esférica M es un tipo de 3-variedad de la forma donde es un subgrupo finito del grupo ortogonal SO(4) actuando libremente mediante rotaciones sobre una 3-esfera . Todos estas variedades son , y . Las 3 variedades esféricas a veces se denominan 3-variedades elípticas o variedades de Clifford-Klein. (es) In mathematics, a spherical 3-manifold M is a 3-manifold of the form where is a finite subgroup of SO(4) acting freely by rotations on the 3-sphere . All such manifolds are prime, orientable, and closed. Spherical 3-manifolds are sometimes called elliptic 3-manifolds or Clifford-Klein manifolds. (en)
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rdfs:comment	En matemáticas, un espacio esférico tridimensional o 3-variedad esférica M es un tipo de 3-variedad de la forma donde es un subgrupo finito del grupo ortogonal SO(4) actuando libremente mediante rotaciones sobre una 3-esfera . Todos estas variedades son , y . Las 3 variedades esféricas a veces se denominan 3-variedades elípticas o variedades de Clifford-Klein. (es) In mathematics, a spherical 3-manifold M is a 3-manifold of the form where is a finite subgroup of SO(4) acting freely by rotations on the 3-sphere . All such manifolds are prime, orientable, and closed. Spherical 3-manifolds are sometimes called elliptic 3-manifolds or Clifford-Klein manifolds. (en)
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