Triangulations of the Sphere

Abstract

Thurston gave a simple way to construct all triangulations of the sphere for which 5 or 6 triangles meet at each vertex, using the Eisenstein integers E. While such triangulations can be defined purely combinatorially, Thurston noticed that given such a triangulation, one can make all the triangles into flat equilateral triangles with the same edge length, and this gives the 2-sphere a flat Riemannian metric except at 12 cone points with angle deficit π/3. He showed that up to rescaling, all such Riemannian metrics arise from his procedure. He studied the moduli space M of all such metrics modulo rescaling, and showed that M is open and dense in an orbifold M = PC10+/Γ. Here C10+ = \ v ∈ C10 \; Q(v) > 0\ for some quadratic form Q of signature (1,9) on C10, PC10+ is its projectivization, and Γ is a certain discrete group of linear transformations of C10 preserving both Q and the lattice E10 ⊂ C10. He also showed that M is the moduli space of flat Riemannian metrics on the sphere with at most 12 cone points and angle deficits that are positive integer multiples of π/3. Here we briefly outline the basic ideas behind this work, and illustrate them with examples.