We prove that the local version of the chain rule cannot hold for the fractional variation defined in our previous article (2019). In the case n = 1, we prove a stronger result, is a consequence of some surprising rigidity properties for non-negative functions with bounded fractional variation which, in turn, are derived from a fractional Hardy inequality localized to half-spaces. Our approach exploits the distributional techniques developed in our previous works (2019-2022). As a byproduct, we refine the fractional Hardy inequality obtained in works of Shieh and Spector (2018) and Spector (J. Funct. Anal. 279 (2020), article no. 108559) and we prove a fractional version of the closely related Meyers-Ziemer trace inequality.

Failure of the local chain rule for the fractional variation / Comi, Giovanni E.; Stefani, Giorgio. - In: PORTUGALIAE MATHEMATICA. - ISSN 0032-5155. - 80:1/2(2023), pp. 1-25. [10.4171/pm/2096]

Failure of the local chain rule for the fractional variation

Stefani, Giorgio
2023-01-01

Abstract

We prove that the local version of the chain rule cannot hold for the fractional variation defined in our previous article (2019). In the case n = 1, we prove a stronger result, is a consequence of some surprising rigidity properties for non-negative functions with bounded fractional variation which, in turn, are derived from a fractional Hardy inequality localized to half-spaces. Our approach exploits the distributional techniques developed in our previous works (2019-2022). As a byproduct, we refine the fractional Hardy inequality obtained in works of Shieh and Spector (2018) and Spector (J. Funct. Anal. 279 (2020), article no. 108559) and we prove a fractional version of the closely related Meyers-Ziemer trace inequality.
2023
80
1/2
1
25
https://arxiv.org/abs/2206.03197
Comi, Giovanni E.; Stefani, Giorgio
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/20.500.11767/140476
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