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Local deformations of branched projective structures: Schiffer variations and the Teichmüller map
Published 13 Nov 2019 in math.CV, math.AG, math.DG, and math.GT | (1911.05290v2)
Abstract: We study a class of continuous deformations of branched complex projective structures on closed surfaces of genus $g\geq 2$, which preserve the holonomy representation of the structure and the order of the branch points. In the case of non-elementary holonomy we show that when the underlying complex structure is infinitesimally preserved the branch points are necessarily arranged on a canonical divisor, and we establish a partial converse for hyperelliptic structures.
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