Uniform Convergence of Metrics on Alexandrov Surfaces with Bounded Integral Curvature

Abstract

We prove uniform convergence of metrics gk on a closed surface with bounded integral curvature (measure) in the sense of A.D. Alexandrov, under the assumption that the curvature measures Kgk=μ1k-μ2k, where μ1k,μ2k are nonnegative Radon measures converging weakly to measures μ1,μ2 respectively, and μ1 is less than 2π at each point (no cusps). This is the global version of Yu. G. Reshetnyak's well-known result on uniform convergence of metrics on a domain in C, and answers affirmatively the open question on the metric convergence on a closed surface. We also give an analytic proof of the fact that a (singular) metric g=e2ug0 with bounded integral curvature on a closed Riemannian surface (,g0) can be approximated by smooth metrics in the fixed conformal class [g0]. % in terms of distance functions, curvature measures and conformal factors. Results on a closed surface with varying conformal classes and on complete noncompact surfaces are obtained as well.