Gluing equations for real projective structures on 3-manifolds

Abstract

Given an orientable ideally triangulated 3--manifold M, we define a system of real valued equations and inequalities whose solutions can be used to construct projective structures on M. These equations represent a unifying framework for the classical Thurston gluing equations in hyperbolic geometry and their more recent counterparts in Anti-de Sitter and half-pipe geometry. Moreover, these equations can be used to detect properly convex structures on M. The paper also includes a few explicit examples where the equations are used to construct properly convex structures.