On finite index subgroups of a universal group

G. Brumfiel; H. Hilden; M. T. Lozano; J. M. Montesinos--Amilibia; E. Ramirez--Losada; H. Short; D. Tejada; D. Toro

On finite index subgroups of a universal group

Geometric Topology 2007-11-01 v1

Authors: G. Brumfiel , H. Hilden , M. T. Lozano , J. M. Montesinos--Amilibia , E. Ramirez--Losada , H. Short , D. Tejada , D. Toro

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Abstract

The orbifold group of the Borromean rings with singular angle 90 degrees, $U$ , is a universal group, because every closed oriented 3--manifold $M^{3}$ occurs as a quotient space $M^{3} = H^{3}/G$ , where $G$ is a finite index subgroup of $U$ . Therefore, an interesting, but quite difficult problem, is to classify the finite index subgroups of the universal group $U$ . One of the purposes of this paper is to begin this classification. In particular we analyze the classification of the finite index subgroups of $U$ that are generated by rotations.

Keywords

finite group theory group theory manifolds

Cite

@article{arxiv.0710.5835,
  title  = {On finite index subgroups of a universal group},
  author = {G. Brumfiel and H. Hilden and M. T. Lozano and J. M. Montesinos--Amilibia and E. Ramirez--Losada and H. Short and D. Tejada and D. Toro},
  journal= {arXiv preprint arXiv:0710.5835},
  year   = {2007}
}

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15 pages, 9 figures

On finite index subgroups of a universal group

Abstract

Keywords

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