English

Maximal operators and decoupling for $\Lambda(p)$ Cantor measures

Classical Analysis and ODEs 2018-09-11 v2

Abstract

For 2p<2\leq p<\infty, α>2/p\alpha'>2/p, and δ>0\delta>0, we construct Cantor-type measures on R\mathbb{R} supported on sets of Hausdorff dimension α<α\alpha<\alpha' for which the associated maximal operator is bounded from Lδp(R)L^p_\delta (\mathbb{R}) to Lp(R)L^p(\mathbb{R}). Maximal theorems for fractal measures on the line were previously obtained by Laba and Pramanik. The result here is weaker in that we are not able to obtain LpL^p estimates; on the other hand, our approach allows Cantor measures that are self-similar, have arbitrarily low dimension α>0\alpha>0, and have no Fourier decay. The proof is based on a decoupling inequality similar to that of Laba and Wang.

Keywords

Cite

@article{arxiv.1808.05657,
  title  = {Maximal operators and decoupling for $\Lambda(p)$ Cantor measures},
  author = {Izabella Laba},
  journal= {arXiv preprint arXiv:1808.05657},
  year   = {2018}
}

Comments

26 pages. Minor corrections, two references added

R2 v1 2026-06-23T03:36:16.005Z