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Asymptoticity of grafting and Teichmüller rays I

arXiv:1109.5365 · doi:10.2140/gt.2014.18.2127

Abstract

We show that any grafting ray in Teichmüller space determined by an arational lamination or a multi-curve is (strongly) asymptotic to a Teichmüller geodesic ray. As a consequence the projection of a generic grafting ray to moduli space is dense. We also show that the set of points in Teichmüller space obtained by integer (2π-) graftings on any hyperbolic surface projects to a dense set, which implies that complex projective surfaces with any fixed Fuchsian holonomy are dense in moduli space.

49 pages, 20 figures. Improved exposition in v2. Accompanies a re-titled second part