Triangulating metric surfaces

Creutz, Paul; Romney, Matthew

doi:10.1112/plms.12486

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Triangulating metric surfaces

Abstract: We prove that any length metric space homeomorphic to a surface may be decomposed into non‐overlapping convex triangles of arbitrarily small diameter. This generalizes a previous result of Alexandrov–Zalgaller for surfaces of bounded curvature.

Cited by 4 publications

References 23 publications

An Introduction to Reshetnyak’s Theory of Subharmonic Distances

An Introduction to Reshetnyak’s Theory of Subharmonic Distances

Curvature bounds on length-minimizing discs

Polyhedral approximation of metric surfaces and applications to uniformization

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