Complexification of an infinite volume Coxeter tetrahedron

Abstract

Let T be an infinite volume Coxeter tetrahedron in three dimensional real hyperbolic space H3 R with two opposite right-angles and the other angles are all zeros. Let G be the Coxeter group of T, so G= 1, 2, 3, 4 | array c 12= 22 = 32=42=id, \\ (1 3)2=(2 4)2=id array as an abstract group. We study type-preserving representations : G → PU(3,1), where ( i)=Ii is a complex reflection fixing a complex hyperbolic plane in three dimensional complex hyperbolic space H3 C for 1 ≤ i ≤ 4. The moduli space M of these representations is parameterized by θ ∈ [5 π6, π]. In particular, θ=5 π6 and θ=π degenerate to H2 C-geometry and H3 R-geometry respectively. Via Dirichlet domains, we show =θ is a discrete and faithful representation of the group G for all θ ∈ [5 π6, π]. This is the first nontrivial moduli space in three dimensional complex hyperbolic space that has been studied completely.