Published Paper
Inserted: 14 nov 2024
Last Updated: 14 aug 2025
Journal: J. Funct. Anal.
Year: 2024
Abstract:
We prove a refined version of the celebrated Lusin type theorem for gradients by Alberti, stating that any Borel vector field $f$ coincides with the gradient of a $C^1$ function $g$, outside a set $E$ of arbitrarily small Lebesgue measure. We replace the Lebesgue measure with any Radon measure $\mu$, and we obtain that the estimate on the $L^p$ norm of $Dg$ does not depend on $\mu(E)$, if the value of $f$ is $\mu$-a.e. orthogonal to the decomposability bundle of $\mu$. We observe that our result implies the 1-dimensional version of the flat chain conjecture by Ambrosio and Kirchheim on the equivalence between metric currents and flat chains with finite mass in $\mathbb{R}^n$ and we state a suitable generalization for $k$-forms, which would imply the validity of the conjecture in full generality.
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