English

Improved weighted restriction estimates in $\Bbb R^3$

Classical Analysis and ODEs 2022-06-14 v1

Abstract

Suppose 0<αn0 < \alpha \leq n, H:Rn[0,1]H: \Bbb R^n \to [0,1] is a Lebesgue measurable function, and Aα(H)A_\alpha(H) is the infimum of all numbers CC for which the inequality BH(x)dxCRα\int_B H(x) dx \leq C R^\alpha holds for all balls BRnB \subset \Bbb R^n of radius R1R \geq 1. After Guth introduced polynomial partitioning to Fourier restriction theory, weighted restriction estimates of the form EfLp(B,Hdx)CRϵAα(H)1/pfLq(σ)\| Ef \|_{L^p(B,Hdx)} \leq C R^\epsilon A_\alpha(H)^{1/p} \| f \|_{L^q(\sigma)} have been studied and proved in several papers, leading to new results about the decay properties of spherical means of Fourier transforms of measures and, in some cases, to progress on Falconer's distance set conjecture in geometric measure theory. This paper improves on the known estimates when EE is the extension operator associated with the unit paraboloid PR3{\mathcal P} \subset \Bbb R^3, reaching the full possible range of p,qp,q exponents (up to the sharp line) for p3+(α2)/(α+1)p \geq 3 + (\alpha-2)/(\alpha+1) and 2<α32 < \alpha \leq 3.

Keywords

Cite

@article{arxiv.2206.06325,
  title  = {Improved weighted restriction estimates in $\Bbb R^3$},
  author = {Bassam Shayya},
  journal= {arXiv preprint arXiv:2206.06325},
  year   = {2022}
}

Comments

20 pages

R2 v1 2026-06-24T11:49:25.863Z