Tame and relatively elliptic CP1-structures on the thrice-punctured sphere

Abstract

Suppose a relatively elliptic representation of the fundamental group of the thrice-punctured sphere S is given. We prove that all projective structures on S with holonomy and satisfying a tameness condition at the punctures can be obtained by grafting certain circular triangles. The specific collection of triangles is determined by a natural framing of . In the process, we show that (on a general surface of negative Euler characteristics) structures satisfying these conditions can be characterized in terms of their M\"obius completion, and in terms of certain meromorphic quadratic differentials.