English

Lp bounds for Stein's spherical maximal operators

Analysis of PDEs 2023-05-01 v3 Classical Analysis and ODEs

Abstract

Let Mα{\frak M}^\alpha be the spherical maximal operators of complex order α\alpha on Rn{\mathbb R^n}. In this article we show that when n2n\geq 2, suppose \begin{eqnarray*} \|{\frak M}^{\alpha} f \|_{L^p({\mathbb R^n})} \leq C\|f \|_{L^p({\mathbb R^n})} \end{eqnarray*} holds for some α\alpha and p2p\geq 2, then we must have Reαmax{1/p(n1)/2, (n1)/p}.{\rm Re}\,\alpha \geq \max \{1/p-(n-1)/2,\ -(n-1)/p \}. When n=2n=2, we prove that MαfLp(R2)CfLp(R2)\|{\frak M}^{\alpha} f \|_{L^p({\mathbb R^2})} \leq C\|f \|_{L^p({\mathbb R^2})} if Re  α>max{1/p1/2, 1/p}{\rm Re}\ \ \alpha>\max\{1/p-1/2,\ -1/p\}, and hence the range of α\alpha is sharp in the sense the estimate fails for Re α<max{1/p1/2,1/p}.{\rm Re}\ \alpha <\max\{1/p-1/2, -1/ p\}.

Keywords

Cite

@article{arxiv.2303.08655,
  title  = {Lp bounds for Stein's spherical maximal operators},
  author = {Naijia Liu and Minxing Shen and Liang Song and Lixin Yan},
  journal= {arXiv preprint arXiv:2303.08655},
  year   = {2023}
}

Comments

14 pages

R2 v1 2026-06-28T09:18:35.545Z