Finiteness of integral representations on 2-perfect truncation polytopes

Abstract

Let P be a compact hyperbolic Coxeter truncation polytope of dimension d 3, and let be the orbifold fundamental group of the associated Coxeter orbifold OP. Let G(,G) be the geometric component containing the holonomy representation in Hom(,G)/G. G(,G) is identified with the deformation space of properly convex real projective structures on the Coxeter orbifold OP. We prove that G(,G) contains only finitely many integral representations. The same conclusion holds more generally for irreducible, large, 2-perfect truncation polytopes.