The moduli space of the modular group in three-dimensional complex hyperbolic geometry

Abstract

We study the moduli space of discrete, faithful, type-preserving representations of the modular group PSL(2,Z) into PU(3,1). The entire moduli space M is a union of M(0,2π3,4π3), M(2π3,4π3,4π3) and some isolated points. This is the first Fuchsian group such that its PU(3,1)-representations space has been entirely constructed. Both M(0,2π3,4π3) and M(2π3,4π3,4π3) are parameterized by a square, where two opposite sides of the square correspond to representations of PSL(2,Z) into the smaller group PU(2,1). In particular, both sub moduli spaces M(0,2π3,4π3 ) and M(2π3,4π3,4π3) interpolate the geometries studied in FalbelKoseleff:2002 and Falbelparker:2003.