On conformally flat circle bundles over surfaces

Abstract

We study surface groups in SO(4,1), which is the group of Mobius tranformations of S3, and also the group of isometries of H4. We consider such so that its limit set is a quasi-circle in S3, and so that the quotient (S3 - ) / is a circle bundle over a surface. This circle bundle is said to be conformally flat, and our main goal is to discover how twisted such bundle may be by establishing a bound on its Euler number. By combinatorial approaches, we have two soft bounds in this direction on certain types of nice structures. In this article we also construct new examples, a "grafting" type path in the space of surface group representations into SO(4,1): starting inside the quasi-Fuschsian locus, going through non-discrete territory and back.