Timeline for Is there a uniform version of Lebesgue's differentiation theorem?
Current License: CC BY-SA 4.0
8 events
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| Jul 15, 2023 at 12:36 | comment | added | Guillaume Geoffroy | I think Federer's "Geometric measure theory" has it, chapter 2.9 (by which I mean, I think his conditions on $\mu$ are equivalent to Radon in the case of $X=\mathbb R$). | |
| Jul 15, 2023 at 10:58 | comment | added | Z. M | Could you please give a reference for the Lebesgue differentiation theorem that you wrote (for general Radon measures)? I vaguely remember that there is a version of Hardy–Littlewood maximal functions for metric measure spaces $(X,d,\mu)$ with growth and homogeneity conditions on $\mu(B(x,r))$, but you seem to allow any Radon measure. | |
| Jul 14, 2023 at 13:31 | history | edited | Guillaume Geoffroy | CC BY-SA 4.0 |
Linked to a simplified version of the problem on math.stackexchange
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| Jul 9, 2023 at 16:38 | history | edited | Guillaume Geoffroy | CC BY-SA 4.0 |
deleted 2 characters in body
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| Jul 9, 2023 at 16:29 | history | edited | Guillaume Geoffroy | CC BY-SA 4.0 |
edited body
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| Jul 9, 2023 at 16:27 | history | edited | Guillaume Geoffroy | CC BY-SA 4.0 |
edited title
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| S Jul 9, 2023 at 16:27 | review | First questions | |||
| Jul 9, 2023 at 18:15 | |||||
| S Jul 9, 2023 at 16:27 | history | asked | Guillaume Geoffroy | CC BY-SA 4.0 |