The space of properly-convex structures

Abstract

Suppose G is finitely generated group and C(G) consists of all :GPGL(n+1,R) for which there exists a properly convex set in RPn that is preserved by (G). Then the image of C(G) is closed in the character variety. Suppose G does not contain an infinite, normal, abelian subgroup and D(G)⊂C(G) is the subset of holonomies of properly-convex n-manifolds with fundamental group G. Then the image D(G) is closed in the character variety. If M is the interior of a compact n-manifold and G=π1M is as above, and either M is closed, or π1M contains a subgroup of infinite index isomorphic to Zn-1, then D(G) is closed. If, in addition, M is the interior of a compact manifold N such that every component of ∂ N is π1-injective, and finitely covered by a torus, then every element of D(G) is the holonomy of a properly-convex structure on M, and D(G) is a union of connected components of a semi-algebraic set.