English

Choquet integrals, Hausdorff content and sparse operators

Functional Analysis 2023-10-17 v1

Abstract

Let HdH^d, 0<d<n0<d<n, be the dyadic Hausdorff content of the nn-dimensional Euclidean space Rn{\mathbb R}^n. It is shown that HdH^d counts a~Cantor set of the unit cube [0,1)n[0, 1)^n as 1\approx 1, which implies unboundedness of the sparse operator AS{\mathcal A}_{{\mathcal S}} on the Choquet space Lp(Hd){\mathcal L}^p(H^d), p>0p>0. In this paper we verify that the sparse operator AS{\mathcal A}_{{\mathcal S}} maps Lp(Hd){\mathcal L}^p(H^d), 1p<1\le p<\infty, into an associate space of Orlicz-Morrey space MΦ0p(Hd){{\mathcal M}^{p'}_{\Phi_0}(H^d)}', Φ0(t)=tlog(e+t)\Phi_0(t)=t\log(e+t). We also give another characterizations of those associate spaces using the tiling T{\mathcal T} of Rn{\mathbb R}^n.

Keywords

Cite

@article{arxiv.2310.10135,
  title  = {Choquet integrals, Hausdorff content and sparse operators},
  author = {Naoya Hatano and Ryota Kawasumi and Hiroki Saito and Hitoshi Tanaka},
  journal= {arXiv preprint arXiv:2310.10135},
  year   = {2023}
}
R2 v1 2026-06-28T12:51:35.968Z