English

Solyanik estimates in harmonic analysis

Classical Analysis and ODEs 2015-09-01 v2

Abstract

Let B\mathcal{B} denote a collection of open bounded sets in Rn\mathbb{R}^n, and define the associated maximal operator MBM_{\mathcal{B}} by MBf(x):=supxRB1RRf. M_{\mathcal{B}}f(x) := \sup_{x \in R \in \mathcal{B}} \frac{1}{|R|}\int_R |f|. The sharp Tauberian constant of MBM_{\mathcal{B}} associated to α\alpha, denoted by CB(α)C_{\mathcal{B}}(\alpha), is defined as CB(α):=supE:0<E<1E{xRn:MBχE(x)>α}. C_{\mathcal{B}}(\alpha) := \sup_{E :\, 0 < |E| < \infty}\frac{1}{|E|}\big|\big\{x \in \mathbb{R}^n:\, M_{\mathcal{B}}\chi_E (x) > \alpha\big\}\big|. Motivated by previous work of A. A. Solyanik, we show that if MBM_{\mathcal{B}} is the uncentered Hardy-Littlewood maximal operator associated to balls, the estimate limα1CB(α)=1 \lim_{\alpha \rightarrow 1^-}C_{\mathcal{B}}(\alpha) = 1 holds. Similar results for iterated maximal functions are obtained, and open problems in the field of Solyanik estimates are also discussed.

Keywords

Cite

@article{arxiv.1310.3771,
  title  = {Solyanik estimates in harmonic analysis},
  author = {Paul A. Hagelstein and Ioannis Parissis},
  journal= {arXiv preprint arXiv:1310.3771},
  year   = {2015}
}

Comments

17 pages, 2 figures, minor typos corrected, to appear in Springer Proceedings in Mathematics & Statistics

R2 v1 2026-06-22T01:46:46.927Z