There are other pages on the web on Kakeya and Restriction; Ben Green, Alex Iosevich, and Izabella Laba all maintain one. If you are new to this field and want to learn more, I can suggest starting with my Notices article surveying this field. If you then want to learn more about the Kakeya problem, you could try the El Escorial proceedings survey with Nets Katz, or the Edinburgh lecture notes on the Kakeya problem; if you want to learn more about the restriction problem, I can offer my Park city notes on the Restriction problem. You can also see my Math 254B home page for a more leisurely-paced introduction, but it is getting a little out of date. If you are more into the algebraic side of things, you can learn about the finite field analogues of these problems in this paper with Gerd Mockenhaupt. If you like the arithmetic combinatorial side of things, you can start with this short paper with Nets, or my Math 254A home page. If you are instead interested in the Bochner Riesz or local smoothing problems, you will have to go to my research papers, such as my second paper with Ana Vargas; I do not yet have a good survey of these problems (one should probably go look instead at the home pages of Izabella Laba or of the papers of Tom Wolff), although I mention these problems briefly in the Park city notes.
Title | With | Status | Download |
| Proc. Amer. Math. Soc. 124 (1996), 2797-2805 | ||
The Bochner-Riesz conjecture implies the restriction conjecture |
| Duke Math. J. 96 (1999), 363-376 | |
The weak-type endpoint Bochner-Riesz conjecture and related topics |
| Indiana U. Math. J. 47 (1998), 1097-1124 | |
A bilinear approach to the restriction and Kakeya conjectures | Ana Vargas Luis Vega | J. Amer. Math. Soc. 11 (1998), 967-1000 | Summary: dvi *see errata below* |
On the Maximal Bochner-Riesz conjecture in the plane, for p<2 |
| Trans. Amer. Math. Soc. 354 (2002), 1947-1959 | |
A bilinear approach to cone multipliers I. Restriction estimates | Ana Vargas | GAFA 10 (2000), 185-215 | Summary: dvi *see errata below* |
Ana Vargas | GAFA10 (2000), 216-258 | ||
An improved bound on the Minkowski dimension of Besicovitch sets in R^3 | Annals of Math. 152 (2000), 383-446 | ||
Endpoint bilinear restriction theorems for the cone, and some sharp null form estimates |
| Math. Z. 238 (2001), 215-268 | Non-endpoint: dvi Informal: dvi |
Bounds on arithmetic projections, and applications to the Kakeya conjecture | Math. Res. Letters 6 (1999), 625-630 | ||
An x-ray transform estimate in R^n | Revista Mat. Iber. 17 (2001), 375-408 | Informal: dvi | |
Some connections between the Falconer and Furstenburg conjectures | New York J. Math. 7 (2001), 148-187 | ||
An improved bound for the Minkowski dimension of Besicovitch sets in medium dimension | GAFA 11 (2001), 773-806 | ||
| Notices Amer. Math. Soc. 48 (2001) No 3, 294-303 | ||
Duke Math. J. 121 (2004), 35-74 | |||
New bounds for Kakeya problems | Journal d'Analyse de Jerusalem, 87 (2002), 231-263 | ||
Recent progress on the Kakeya conjecture | Publicacions Matematiques, Proceedings of the 6th International Conference on Harmonic Analysis and Partial Differential Equations, U. Barcelona 2002, 161-180 | ||
Bochner-Riesz summability for analytic functions on the m-complex unit sphere and for cylindrically symmetric functions on R^{n-1} \times R | Comm. Anal. Geom. 12 (2004), 43-57 | ||
A new bound for finite field Besicovitch sets in four dimensions |
| Pacific J. Math 222 (2005), 337-363 | |
A sharp bilinear restriction estimate for paraboloids |
| GAFA 13 (2003), 1359-1384 | |
Some recent progress on the Restriction conjecture |
| Fourier analysis and convexity, 217-243, Appl. Numer. Harmon. Anal., Birkhäuser Boston, Boston,MA, 2004. | *see errata below* |
Recent progress on the Restriction conjecture |
| to appear, Park City proceedings | *see errata below* |
On the Multilinear Restriction and Kakeya conjectures | Jon Bennett | Acta Math. 196 (2006) 261—302 | |
The Kakeya set and maximal conjectures for algebraic varieties over finite fields | Mathematika 56 (2010) 1-25 | ||
Mathematika 66 (2020), 517--576 |
Some further papers related to Kakeya and restriction problems can be found on my PDE preprint page.
Some further papers dealing with more general aspects of harmonic analysis can be found here.
*errata*: There is a typo common to several papers above. Namely, in Lemma 4.5 of “A bilinear approach...” with Vargas and Vega, the condition $(n+1)/2 > alpha q$ should be $(n-1)/2 > alpha q$; and similarly the condition $\sigma + 1 > \alpha q$ should be $\sigma > \alpha q$ in Lemma 6.1 of “A bilinear approach to cone multipliers I” with Vargas, Theorem 5.1 of “Some recent progress on the restriction conjecture”, and Theorem 2.10 of “Recent progress on the restriction conjecture”. Thanks to Monica Visan for pointing out the error.
Finite field analogues of the Erdos, Falconer, and Furstenburg problems | |
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Back to my preprints page.
