English

Spherical maximal operators on radial functions

Functional Analysis 2016-09-06 v1

Abstract

Let Atf(x)=f(x+ty)dσ(y)A_tf(x)=\int f(x+ty)d\sigma(y) denote the spherical means in Rd\Bbb R^d (dσd\sigma is surface measure on Sd1S^{d-1}, normalized to 11). We prove sharp estimates for the maximal function MEf(x)=suptEAtf(x)M_E f(x)=\sup_{t\in E}|A_tf(x)| where EE is a fixed set in R+\Bbb R^+ and ff is a {\it radial} function Lp(Rd)\in L^p(\Bbb R^d). Let pd=d/(d1)p_d=d/(d-1) (the critical exponent of Stein's maximal function). For the cases (i) p<pdp<p_d, d2d\ge 2 and (ii) p=pdp=p_d, d3d\ge 3, and for pqp\le q\le\infty we prove necessary and sufficient conditions for LpLp,qL^p\to L^{p,q} boundedness of the operator MEM_E.

Keywords

Cite

@article{arxiv.math/9601220,
  title  = {Spherical maximal operators on radial functions},
  author = {Andreas Seeger and Stephen Wainger and James Wright},
  journal= {arXiv preprint arXiv:math/9601220},
  year   = {2016}
}