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Conical Metrics on Riemann Surfaces, II: Spherical Metrics

Rafe Mazzeo, Xuwen Zhu

2021International Mathematics Research Notices12 citationsDOIOpen Access PDF

Abstract

Abstract We continue our study, initiated in [34], of Riemann surfaces with constant curvature and isolated conic singularities. Using the machinery developed in that earlier paper of extended configuration families of simple divisors, we study the existence and deformation theory for spherical conic metrics with some or all of the cone angles greater than $2\pi $. Deformations are obstructed precisely when the number $2$ lies in the spectrum of the Friedrichs extension of the Laplacian. Our main result is that, in this case, it is possible to find a smooth local moduli space of solutions by allowing the cone points to split. This analytic fact reflects geometric constructions in [37, 38].

Topics & Concepts

Conic sectionMathematicsModuli spaceConical surfaceCone (formal languages)Gravitational singularityLaplace operatorPure mathematicsRiemann surfaceConstant curvatureMathematical analysisCurvatureSpace (punctuation)GeometryPhilosophyLinguisticsAlgorithmGeometric Analysis and Curvature FlowsGeometry and complex manifoldsAlgebraic Geometry and Number Theory
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