中文

Two-Dimensional Knots and Representations of Hyperbolic Groups

几何拓扑 2007-05-23 v1 表示论

摘要

We describe relations between hyperbolic geometry and codimension two knots or, more exactly, between varieties of conjugacy classes of discrete faithful representations of the fundamental groups of hyperbolic n-manifolds M into SO(n+2,1)\operatorname{SO}^{\circ} (n+2,1) and (n-1)-dimensional knots in the (n+1)-sphere. This approach allows us to discover a phenomenon of non-connectedness of these varieties for closed n-manifolds M, n3n\geq 3, with large enough number of disjoint totally geodesic surfaces, to construct quasisymmetric infinitely compounded "Julia" knots KSn+1K\subset S^{n+1} which are everywhere wild and have recurrent π1(M)\pi_1(M)-action, and to study circle and 2-plane bundles (with geometric structures) over closed hyperbolic n-manifolds.

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引用

@article{arxiv.math/0102202,
  title  = {Two-Dimensional Knots and Representations of Hyperbolic Groups},
  author = {Boris Apanasov},
  journal= {arXiv preprint arXiv:math/0102202},
  year   = {2007}
}

备注

AMSppt TeX, 14 pages and 6 figures (in 4 jpeg files not inserted in TeX)