Prescribed curvature problem for discrete conformality on convex spherical cone-metrics
Abstract
Let S be the 2-sphere and V ⊂ S be a finite set of at least three points. We show that for each function : V → (0, 2π) satisfying elementary necessary conditions, in each discrete conformal class of spherical cone-metrics there exists a unique metric realizing as its discrete curvature. This can be seen as a discrete version of a result of Luo and Tian.
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