Slim curves, limit sets and spherical CR uniformisations

Abstract

We consider here the 3-sphere S3 seen as the boundary at infinity of the complex hyperbolic plane H2 C. It comes equipped with a contact structure and two classes of special curves. First R-circles are boundaries at infinity of totally real totally geodesic subspaces and are tangent to the contact distribution. Second, C-circles, which are boundaries of complex totally geodesic subspaces and are transverse to the contact distribution. We define a quantitative notion, called slimness, that measures to what extent a continuous path in the sphere S3 is near to be an R-circle. We analyze the classical foliation of the complement of an R-circle by arcs of C-circles. Next, we consider deformations of this situation where the R-circle becomes a slim curve. We apply these concepts to the particular case where the slim curve is the limit set of a quasi-Fuchsian subgroup of PU(2,1). As a consequence, we describe a class of spherical CR uniformizations of certain cusped 3-manifolds.

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