The Four Color Theorem meets Shapes of Polyhedra

Abstract

We consider solutions to the 4-color problem for the vertices of sphere triangulations with degree sequence 6,...,6,4,4,4,4,4,4. We sort these solutions into combinatorial types and show that each generic type τ is parametrized by the set of integer lattice points inside a 4-dimensional rational polyhedral convex cone C\/τ. There is an integral quadratic form Qτ on C\/τ whose diagonal part, evaluated on a lattice point, is 3 times the number of triangles in the corresponding triangulation. We relate this structure to the octahedral stratum of Thurston's moduli space of flat cone structures on the sphere.