Alberti's rank one theorem and quasiconformal mappings in metric measure spaces
Abstract
We investigate a version of Alberti's rank one theorem in Ahlfors regular metric spaces, as well as a connection with quasiconformal mappings. More precisely, we give a proof of the rank one theorem that partially follows along the usual steps, but the most crucial step consists in showing for f∈ BV(X;Y) that at Dfs-a.e. x∈ X, the mapping f ``behaves non-quasiconformally''.
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