Holonomy of complex projective structures on surfaces with prescribed branch data

Fils, Thomas Le

doi:10.1112/topo.12287

Journal of Topology

2023

DOI: 10.1112/topo.12287

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Holonomy of complex projective structures on surfaces with prescribed branch data

Thomas Le Fils

Abstract: We characterize the representations of the fundamental group of a closed surface to PSL 2 (ℂ) that arise as the holonomy of a branched complex projective structure with fixed branch divisor. In particular, we compute the holonomies of the spherical metrics with prescribed integral conical angles and the holonomies of affine structures with fixed conical angles on closed surfaces.

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2024

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Moduli spaces of marked branched projective structures on surfaces

Billon

2024

Journal De L’École Polytechnique — Mathématiques

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We show that the moduli space Pg(n) of marked branched projective structures of genus g and branching degree n is a complex analytic space. In the case g ⩾ 2, we show that Pg(n) is of dimension 6g − 6 + n and we characterize its singular points in terms of their monodromy. We introduce a notion of branching class, that is an infinitesimal description of branched projective structures at the branched points. We show that the space Ag(n) of marked branching classes of genus g and branching degree n is a complex manifold. We show that ifRésumé (Espaces de modules de structures projectives branchées sur les surfaces)On montre que l'espace de modules Pg(n) des structures projectives branchées de genre g et de degré de branchement n est un espace analytique complexe. Dans le cas où g ⩾ 2, on montre que Pg(n) est de dimension 6g − 6 + n et on caractérise ses points singuliers en termes de leur monodromie. On introduit une notion de classe de branchement, qui est une description infinitésimale des structures projectives branchées aux points de branchement. On montre que l'espace Ag(n) des classes de branchement marquées de genre g et de degré de branchement n est une variété différentielle complexe. On montre que si n < 2g − 2, l'espace Pg(n) est un fibré affine sur Ag(n), tandis que si n > 4g − 4, Pg(n) est un sous-espace analytique de Ag(n).

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Moduli spaces of marked branched projective structures on surfaces

Billon

2024

Journal De L’École Polytechnique — Mathématiques

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Holonomy of complex projective structures on surfaces with prescribed branch data

Cited by 1 publication

References 36 publications

Moduli spaces of marked branched projective structures on surfaces

Moduli spaces of marked branched projective structures on surfaces

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