Menger curve and Spherical CR uniformization of a closed hyperbolic 3-orbifold

Abstract

Let G6,3= a0, ·s, a5| ai3=id, ai ai+1= ai+1 ai, i ∈ Z/6Z be a hyperbolic group with boundary the Menger curve. J. Granier Granier constructed a discrete, convex cocompact and faithful representation of G6,3 into PU(2,1). We show the 3-orbifold at infinity of (G6,3) is a closed hyperbolic 3-orbifold, with underlying space the 3-sphere and singular locus the Z3-coned chain-link C(6,-2). This answers the second part of Misha Kapovich's Conjecture 10.6Kapovich.