中文

Clusters of Cycles

度量几何 2009-11-07 v1 组合数学

摘要

A {\it cluster of cycles} (or {\it (r,q)(r,q)-polycycle}) is a simple planar 2--co nnected finite or countable graph GG of girth rr and maximal vertex-degree qq, which admits {\it (r,q)(r,q)-polycyclic realization} on the plane, denote it by P(G)P(G), i.e. such that: (i) all interior vertices are of degree qq, (ii) all interior faces (denote their number by prp_r) are combinatorial rr-gons and (implied by (i), (ii)) (iii) all vertices, edges and interior faces form a cell-complex. An example of (r,q)(r,q)-polycycle is the skeleton of (rq)(r^q), i.e. of the qq-valent partition of the sphere S2S^2, Euclidean plane R2R^2 or hyperbolic plane H2H^2 by regular rr-gons. Call {\it spheric} pairs (r,q)=(3,3),(3,4),(4,3),(3,5),(5,3)(r,q)=(3,3),(3,4),(4,3),(3,5),(5,3); for those five pairs P(rq)P(r^q) is (rq)(r^q) without the exterior face; otherwise P(rq)=(rq)P(r^q)=(r^q). We give here a compact survey of results on (r,q)(r,q)-polycycles.

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引用

@article{arxiv.math/0104090,
  title  = {Clusters of Cycles},
  author = {M. Deza and M. Shtogrin},
  journal= {arXiv preprint arXiv:math/0104090},
  year   = {2009}
}

备注

21. to in appear in Journal of Geometry and Physics