English

Sparse Bounds for Spherical Maximal Functions

Classical Analysis and ODEs 2018-12-05 v6

Abstract

We consider the averages of a function f f on Rn \mathbb R ^{n} over spheres of radius 0<r< 0< r< \infty given by Arf(x)=Sn1f(xry)  dσ(y) A_{r} f (x) = \int_{\mathbb S ^{n-1}} f (x-r y) \; d \sigma (y), where σ \sigma is the normalized rotation invariant measure on Sn1 \mathbb S ^{n-1}. We prove a sharp range of sparse bounds for two maximal functions, the first the lacunary spherical maximal function, and the second the full maximal function. Mlacf=supjZA2jf,Mfullf=supr>0Arf. M_{{lac}} f = \sup_{j\in \mathbb Z } A_{2^j} f , \qquad M_{{full}} f = \sup_{ r>0 } A_{r} f . The sparse bounds are very precise variants of the known LpL^p bounds for these maximal functions. They are derived from known Lp L ^{p}-improving estimates for the localized versions of these maximal functions, and the indices in our sparse bound are sharp. We derive novel weighted inequalities for weights in the intersection of certain Muckenhoupt and reverse H\"older classes.

Keywords

Cite

@article{arxiv.1702.08594,
  title  = {Sparse Bounds for Spherical Maximal Functions},
  author = {Michael T. Lacey},
  journal= {arXiv preprint arXiv:1702.08594},
  year   = {2018}
}

Comments

20 pages, 7 figures. To appear in J D'Analyse Math

R2 v1 2026-06-22T18:30:16.672Z