Curvewise characterizations of minimal upper gradients and the construction of a Sobolev differential
Eriksson-Bique, S., & Soultanis, E. (2024). Curvewise characterizations of minimal upper gradients and the construction of a Sobolev differential. Analysis and PDE, 17(2), 455-498. https://doi.org/10.2140/apde.2024.17.455
Julkaistu sarjassa
Analysis and PDEPäivämäärä
2024Tekijänoikeudet
© 2024 MSP
We represent minimal upper gradients of Newtonian functions, in the range 1≤p<∞, by maximal directional derivatives along “generic” curves passing through a given point, using plan-modulus duality and disintegration techniques. As an application we introduce the notion of p-weak charts and prove that every Newtonian function admits a differential with respect to such charts, yielding a linear approximation along p-almost every curve. The differential can be computed curvewise, is linear, and satisfies the usual Leibniz and chain rules.
The arising p-weak differentiable structure exists for spaces with finite Hausdorff dimension and agrees with Cheeger’s structure in the presence of a Poincaré inequality. In particular, it exists whenever the space is metrically doubling. It is moreover compatible with, and gives a geometric interpretation of, Gigli’s abstract differentiable structure, whenever it exists. The p-weak charts give rise to a finite-dimensional p-weak cotangent bundle and pointwise norm, which recovers the minimal upper gradient of Newtonian functions and can be computed by a maximization process over generic curves. As a result we obtain new proofs of reflexivity and density of Lipschitz functions in Newtonian spaces, as well as a characterization of infinitesimal Hilbertianity in terms of the pointwise norm.
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Julkaisija
Mathematical Sciences PublishersISSN Hae Julkaisufoorumista
2157-5045Asiasanat
Julkaisu tutkimustietojärjestelmässä
https://converis.jyu.fi/converis/portal/detail/Publication/207600722
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Suomen AkatemiaRahoitusohjelmat(t)
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Eriksson-Bique was partially supported by National Science Foundation under grant no. DMS-1704215 and by the Finnish Academy under research postdoctoral grant no. 330048. Soultanis was supported by the Swiss National Science Foundation Grant 182423. Throughout the project the authors have had insightful discussions with Nageswari Shanmugalingam, which have been tremendously useful. A further thanks goes to Jeff Cheeger and Nicola Gigli for helpful comments and inspiration for the project. The authors thank IMPAN for hosting the semester “Geometry and analysis in function and mapping theory on Euclidean and metric measure space” where this research was started. Through this workshop the authors were partially supported by grant no. 346300 for IMPAN from the Simons Foundation and the matching 2015-2019 Polish MNiSW fund. ...Lisenssi
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