Pushforward of currents under Sobolev maps
Abstract: We prove that a Sobolev map from a Riemannian manifold into a complete metric space pushes forward almost every compactly supported integral current to an Ambrosio--Kirchheim integral current in the metric target, where "almost every" is understood in a modulus sense. As an application, we prove that when the target supports an isoperimetric inequality of Euclidean type for integral currents, an isoperimetric inequality for Sobolev mappings relative to bounded, closed and additive cochains follows. Using the results above, we answer positively to an open question by Onninen and Pankka on sharp H\"older continuity for quasiregular curves. A key tool in the continuity proof is Almgren's isoperimetric inequality for integral currents.
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