A hex sphere is a singular Euclidean sphere with four cone points whose cone
angles are (integer) multiples of $2\pi3$ but less than $2\pi$. We
prove that the Moduli space of hex spheres of unit area is homeomorphic to the
the space of similarity classes of Voronoi polygons in the Euclidean plane.
This result gives us as a corollary that each unit-area hex sphere $M$
satisfies the following properties: (1) it has an embedded (open Euclidean)
annulus that is disjoint from the singular locus of $M$; (2) it embeds
isometrically in the 3-dimensional Euclidean space as the boundary of a
tetrahedron; and (3) there is a simple closed geodesic $\gamma$ in $M$ such
that a fractional Dehn twist along $\gamma$ converts $M$ to the double of a
parallelogram.
%0 Generic
%1 Cruz-Cota2010
%A Cruz-Cota, Aldo-Hilario
%D 2010
%K dehn euclidean singular twist
%T The moduli space of hex spheres
%U http://arxiv.org/abs/1010.5235
%X A hex sphere is a singular Euclidean sphere with four cone points whose cone
angles are (integer) multiples of $2\pi3$ but less than $2\pi$. We
prove that the Moduli space of hex spheres of unit area is homeomorphic to the
the space of similarity classes of Voronoi polygons in the Euclidean plane.
This result gives us as a corollary that each unit-area hex sphere $M$
satisfies the following properties: (1) it has an embedded (open Euclidean)
annulus that is disjoint from the singular locus of $M$; (2) it embeds
isometrically in the 3-dimensional Euclidean space as the boundary of a
tetrahedron; and (3) there is a simple closed geodesic $\gamma$ in $M$ such
that a fractional Dehn twist along $\gamma$ converts $M$ to the double of a
parallelogram.
@misc{Cruz-Cota2010,
abstract = { A hex sphere is a singular Euclidean sphere with four cone points whose cone
angles are (integer) multiples of $\frac{2\pi}{3}$ but less than $2\pi$. We
prove that the Moduli space of hex spheres of unit area is homeomorphic to the
the space of similarity classes of Voronoi polygons in the Euclidean plane.
This result gives us as a corollary that each unit-area hex sphere $M$
satisfies the following properties: (1) it has an embedded (open Euclidean)
annulus that is disjoint from the singular locus of $M$; (2) it embeds
isometrically in the 3-dimensional Euclidean space as the boundary of a
tetrahedron; and (3) there is a simple closed geodesic $\gamma$ in $M$ such
that a fractional Dehn twist along $\gamma$ converts $M$ to the double of a
parallelogram.
},
added-at = {2010-10-26T14:16:28.000+0200},
author = {Cruz-Cota, Aldo-Hilario},
biburl = {https://www.bibsonomy.org/bibtex/2c436aa69699f976a6e57218cc6ef5a5d/uludag},
description = {The moduli space of hex spheres},
interhash = {263bbbbad4b9afcf9c7923d15c15c8b5},
intrahash = {c436aa69699f976a6e57218cc6ef5a5d},
keywords = {dehn euclidean singular twist},
note = {cite arxiv:1010.5235
},
timestamp = {2010-10-26T14:16:28.000+0200},
title = {The moduli space of hex spheres},
url = {http://arxiv.org/abs/1010.5235},
year = 2010
}