Three-dimensional complex reflection groups via Ford domains

Abstract

We initiate the study of deformations of groups in three-dimensional complex hyperbolic geometry. Let G= 1, 2, 3, 4 | arrayc 12= 22 = 32=42=id,\\ (1 3)2=(1 4)3=(2 4)2=id array be an abstract group. We study representations : G → PU(3,1), where ( i)=Ii is a complex reflection fixing a complex hyperbolic plane in H3 C for 1 ≤ i ≤ 4, with the additional condition that I1I2 is parabolic. When we assume two pairs of hyper-parallel complex hyperbolic planes have the same distance, then the moduli space M is parameterized by (h,t) ∈ [1, ∞) × [0, π] but t ≤ arccos(-3h2+14h2). In particular, t=0 and t=arccos(-3h2+14h2) degenerate to H3 R-geometry and H2 C-geometry respectively. Using the Ford domain of (2,arccos(-78))(G) as a guide, we show (h,t) is a discrete and faithful representation of G → PU(3,1) when (h,t) ∈ M is near to (2, arccos(-78)). This is the first nontrivial example of the Ford domain of a subgroup in PU(3,1) that has been studied.