2 π-grafting and complex projective structures, I
Abstract
Let S be a closed oriented surface of genus at least two. Gallo, Kapovich, and Marden asked if 2π-graftings produce all projective structures on S with arbitrarily fixed holonomy (Grafting Conjecture). In this paper, we show that the conjecture holds true "locally" in the space GL of geodesic laminations on S via a natural projection of projective structures on S into GL in the Thurston coordinates. In the sequel paper, using this local solution, we prove the conjecture for generic holonomy.
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