This paper develops the local deformation theory, and some aspects of the global Teichmüller theory, of constant curvature metrics on a surface Σ with a finite number of conic singularities, with all cone angles less than 2π. We approach this using techniques of geometric analysis and the theory of elliptic operators on conic spaces.
CITATION STYLE
Mazzeo, R., & Weiss, H. (2017). Teichmüller theory for conic surfaces. In Progress in Mathematics (Vol. 310, pp. 127–164). Springer Basel. https://doi.org/10.1007/978-3-319-49638-2_7
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