Toric geometry of SL2(C) free group character varieties from outer space

Abstract

Culler and Vogtmann defined a simplicial space O(g) called outer space to study the outer automorphism group of the free group Fg. Using representation theoretic methods, we give an embedding of O(g) into the analytification of X(Fg, SL2(C)), the SL2(C) character variety of Fg, reproving a result of Morgan and Shalen. Then we show that every point v contained in a maximal cell of O(g) defines a flat degeneration of X(Fg, SL2(C)) to a toric variety X(P). We relate X(Fg, SL2(C)) and X(v) topologically by showing that there is a surjective, continuous, proper map v: X(Fg, SL2(C)) X(v). We then show that this map is a symplectomorphism on a dense, open subset of X(Fg, SL2(C)) with respect to natural symplectic structures on X(Fg, SL2(C)) and X(v). In this way, we construct an integrable Hamiltonian system in X(Fg, SL2(C)) for each point in a maximal cell of O(g), and we show that each v defines a topological decomposition of X(Fg, SL2(C)) derived from the decomposition of X(v) by its torus orbits. Finally, we show that the valuations coming from the closure of a maximal cell in O(g) all arise as divisorial valuations built from an associated projective compactification of X(Fg, SL2(C)).