A distinction between the paraboloid and the sphere in weighted restriction

Alex Iosevich; Ruixiang Zhang

Ayuda

A distinction between the paraboloid and the sphere in weighted restriction

Alex Iosevich ^[1] ; Ruixiang Zhang ^[2]
1. [1] University of Rochester
  
  University of Rochester
  
  City of Rochester, Estados Unidos
2. [2] University of California System
  
  University of California System
  
  Estados Unidos
Localización: Selecta Mathematica, New Series, ISSN 1022-1824, Vol. 32, Nº. 3, 2026
Idioma: inglés
DOI: 10.1007/s00029-026-01144-y
Enlaces
- Texto completo
Resumen
- For several weights based on lattice point constructions in Rd (d > 2), we prove that the sharp L2 weighted restriction inequality for the sphere is very different than the corresponding result for the paraboloid. The proof uses Poisson summation, linear algebra, and lattice counting. We conjecture that the L2 weighted restriction is generally better for the circle for a wide variety of general sparse weights.
Referencias bibliográficas
- Barceló, J.A., Bennett, J.M., Carbery, A., Ruiz, A., Vilela, M.C.: Some special solutions of the Schrödinger equation. Indiana University...
- Bourgain, J.: Besicovitch type maximal operators and applications to Fourier analysis. Geometric & Functional Analysis GAFA 1, 147–187...
- Bourgain, J., Demeter, C., Guth, L.: Proof of the main conjecture in Vinogradov’s mean value theorem for degrees higher than three. Annals...
- Du, X.: Upper bounds for Fourier decay rates of fractal measures. J. Lond. Math. Soc. (2) 102(3), 1318–1336 (2020)
- Du, X., Ou, Y., Wang, H., Zhang, R.: On a free Schrödinger solution studied by Barceló–Bennett–Carbery–Ruiz–Vilela. arXiv preprint arXiv:2303.10563,...
- Xiumin, D., Zhang, R.: Sharp estimates of the Schrödinger maximal function in higher dimensions. Ann. of Math. (2) 189(3), 837–861 (2019)
- Erdős, P.: On sets of distances of points. Am. Math. Mon. 53(5), 248–250 (1946)
- Falconer, K.J.: On the Hausdorff dimensions of distance sets. Mathematika 32, 206–212 (1986)
- Guo, S., Wang, H., Zhang, R.: A dichotomy for Hörmander-type oscillatory integral operators. arXiv preprint arXiv:2210.05851, (2022)
- Guth, L.: A restriction estimate using polynomial partitioning. J. Am. Math. Soc. 29(2), 371–413 (2016)
- Guth, L.: Restriction estimates using polynomial partitioning II. Acta Math. 221, 81–142 (2018)
- Guth, L., Iosevich, A., Yumeng, O., Wang, H.: On Falconer’s distance set problem in the plane. Invent. Math. 219(3), 779–830 (2020)
- Guth, L., Iosevich, A., Yumeng, O., Wang, H.: On Falconer’s distance set problem in the plane. Invent. Math. 219(3), 779–830 (2020)
- Guth, L., Katz, N.H.: On the Erdős distinct distances problem in the plane. Annals of mathematics, pages 155–190, (2015)
- Heath-Brown, D.R.: The density of rational points on cubic surfaces. Acta Arith 79(1), 17–30 (1997)
- Hickman, J., Rogers, K.M.: Improved Fourier restriction estimates in higher dimensions. Cambridge J. Math. 7(3), 219–282 (2019)
- Hickman, J., Zahl, J.: A note on Fourier restriction and nested Polynomial Wolff Axioms. Journal d’Analyse Mathématique, pages 1–34, (2023)
- Iosevich, A.: Fourier transform, restriction theorem, and scaling. Boll. Unione Mat. Ital. Sez. B Artic. Ric. Mat. (8), 2(2):383–387, (1999)
- Iosevich, A., Rudnev, M.: Distance measures for well-distributed sets. Discrete Comput. Geom. 38(1), 61–80 (2007)
- Iosevich, A., Senger, S.: Sharpness of Falconer’s estimate. Ann. Acad. Sci. Fenn. Math. 41(2), 713–720 (2016)
- Iosevich, A., Taylor, K.: Lattice points close to families of surfaces, nonisotropic dilations and regularity of generalized Radon transforms....
- Katz, N.M.: Gauss Sums, Kloosterman Sums, and Monodromy Groups. Princeton University Press, Princeton, New Jersey (1988)
- Kiyohara, D.: Lattice points on a curve via decoupling. Int J Number Theor 20(08), 2045–2057 (2024). https://doi.org/10.1142/S1793042124500994
- Li, X., Yang, X.: Improvement on Gauss circle problem and Dirichlet divisor problem. arXiv preprint arXiv:2308.14859, (2023)
- Mattila, P.: Spherical averages of fourier transforms of measures with finite energy: dimensions of intersections and distance sets. Mathematika...
- Shayya, B.: Fourier restriction in low fractal dimensions. Proc. Edinb. Math. Soc. 64(2), 373–407 (2021)
- Spencer, J., Szemerédi, E., Trotter, W.T.: Unit distances in the Euclidean plane. In Graph theory and combinatorics, pages 294–304. Academic...
- Stein, E.M.: Harmonic Analysis. Princeton University Press, (1993)
- Stein, E.M.: Some problems in harmonic analysis. In Harmonic analysis in Euclidean spaces, Proceedings of the Symposium in Pure Mathematics...
- Wang, H.: A restriction estimate in using brooms. Duke Math. J. 171(8), 1749–1822 (2022)
- Wang, H., Wu, S.: An improved restriction in . arXiv preprint arXiv:2210.03878, (2022)