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Rectifiability of RCD(K,N) spaces via δ-splitting maps

Elia Brué, Enrico Pasqualetto, Daniele Semola

2021Annales Fennici Mathematici19 citationsDOIOpen Access PDF

Abstract

In this note we give simplified proofs of rectifiability of RCD(K,N) spaces as metric measure spaces and lower semicontinuity of the essential dimension, via \(\delta\)-splitting maps. The arguments are inspired by the Cheeger-Colding theory for Ricci limits and rely on the second order differential calculus developed by Gigli and on the convergence and stability results by Ambrosio-Honda.

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Mathematical proofMathematicsConvergence (economics)Pure mathematicsDimension (graph theory)Metric (unit)Metric spaceCalculus (dental)Measure (data warehouse)Order (exchange)Stability (learning theory)Mathematical analysisComputer scienceGeometryEngineeringOperations managementFinanceDatabaseMedicineMachine learningEconomic growthDentistryEconomicsGeometric Analysis and Curvature FlowsGeometry and complex manifoldsAdvanced Differential Geometry Research