Metric Currents and Alberti representations
Abstract
We relate Ambrosio-Kirchheim metric currents to Alberti representations and Weaver derivations. In particular, given a metric current T, we show that if the module X(\|T\|) of Weaver derivations is finitely generated, then T can be represented in terms of derivations; this extends previous results of Williams. Applications of this theory include an approximation of 1-dimensional metric currents in terms of normal currents and the construction of Alberti representations in the directions of vector fields.
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