Mathematics – Geometric Topology
Scientific paper
2005-02-16
Mathematics
Geometric Topology
16 pages, 6 figures, AMS-TeX
Scientific paper
Geometrical spines are defined for 3-manifolds with natural metrics, in particular, for lens manifolds. We show that any spine of L(p,q) close enough to its geometrical spine (i.e., to the cut locus with respect to the standard metric) contains at least E(p,q)-3 vertices, which is exactly the conjectured value for Matveev's complexity of L(p,q); here E(p,q) stands for the sum of the elements of the continued fraction expansion of p/q. As a byproduct, we find the minimal (over all triangulations) rotation distance (the term coined by Sleator, Tarjan, and Thurston) between a triangulation of a regular p-gon and its image under (2Pi q/p)-rotation. This minimum is also equal to E(p,q)-3.
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