Complex projective structures with Schottky holonomy

Details Complex projective structures with Schottky holonomy Complex projective structures with Schottky holonomy

2009-06-02

arxiv.org/abs/0906.0413v2

Mathematics

Geometric Topology

52 pages, 14 figures

Scientific paper

A Schottky group in PSL(2, C) induces an open hyperbolic handlebody and its ideal boundary is a closed orientable surface S whose genus is equal to the rank of the Schottky group. This boundary surface is equipped with a (complex) projective structure and its holonomy representation is an epimorphism from pi_1(S) to the Schottky group. We will show that an arbitrary projective structure with the same holonomy representation is obtained by (2 pi-)grafting the basic structure described above.

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