Timeline for Sobolev-type inequality.
Current License: CC BY-SA 3.0
6 events
| when toggle format | what | by | license | comment | |
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| Feb 5, 2015 at 21:38 | comment | added | Paul-Benjamin | @Bazin. The easiest way I know of to get these inequalities uses the Hardy-Littlewood inequality, so if I get your comment correctly, Sobolev embeddings are more straightforward that Hardy-Littlewood, aren't they? | |
| Feb 5, 2015 at 21:32 | comment | added | Paul-Benjamin | @Felice I think that Harmonic Analysis (Real-variable methods, orthogonality, and oscillatory integrals) by Elias Stein is a great reference, it starts from scratch the entire theory, is beautifully written, and contains a great amount of informations. You can also look Singular Integrals and differentiability of functions by Elias Stein, to see a proof of the "easy" cases of the theorem stated by Bazin. | |
| Oct 19, 2012 at 21:40 | vote | accept | Felice | ||
| Oct 20, 2012 at 9:43 | |||||
| Oct 19, 2012 at 20:55 | comment | added | Felice | Thank you! But I was looking for a more "cheep" proof. Anyway can you give me some references to Fourier multiplier? | |
| Oct 19, 2012 at 20:32 | history | edited | Bazin | CC BY-SA 3.0 |
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| Oct 19, 2012 at 20:19 | history | answered | Bazin | CC BY-SA 3.0 |