English

Sharp maximal function estimates for Hilbert transforms along monomial curves in higher dimensions

Classical Analysis and ODEs 2024-08-19 v3

Abstract

For any nonempty set UR+U\subset\R^+, we consider the maximal operator \hU\h^U defined as \hUf=supuUH(u)f\h^Uf=\sup_{u\in U}|H^{(u)} f|, where H(u)H^{(u)} represents the Hilbert transform along the monomial curve uγ(s)u\gamma(s). We focus on the Lp(Rd)L^p(\mathbb{R}^d) operator norm of \hU\h^U for p(p(d),)p\in (p_\circ(d),\infty), where p(d)p_\circ(d) is the optimal exponent known for the LpL^p boundedness of the maximal averaging operator obtained by Ko-Lee-Oh \cite{KLO22,KLO23} and Beltran-Guo-Hickman-Seeger \cite{BGHS}. To achieve this goal, we employ a novel bootstrapping argument to establish a maximal estimate for the Mihlin-H\"{o}rmander-type multiplier, along with utilizing the local smoothing estimate for the averaging operator and its vector-valued extension to obtain crucial decay estimates. Furthermore, our approach offers an alternative means for deriving the upper bound established in \cite{Guo20}.

Keywords

Cite

@article{arxiv.2305.09110,
  title  = {Sharp maximal function estimates for Hilbert transforms along monomial curves in higher dimensions},
  author = {Renhui Wan},
  journal= {arXiv preprint arXiv:2305.09110},
  year   = {2024}
}

Comments

Final version, to appear in JFAA

R2 v1 2026-06-28T10:35:24.260Z