English

Multi-parameter singular Radon transforms III: real analytic surfaces

Classical Analysis and ODEs 2011-05-24 v1

Abstract

The goal of this paper is to study operators of the form, Tf(x)=ψ(x)f(γt(x))K(t)dt, Tf(x)= \psi(x)\int f(\gamma_t(x))K(t)\: dt, where γ\gamma is a real analytic function defined on a neighborhood of the origin in (t,x)RN×Rn(t,x)\in \R^N\times \R^n, satisfying γ0(x)x\gamma_0(x)\equiv x, ψ\psi is a cutoff function supported near 0Rn0\in \R^n, and KK is a "multi-parameter singular kernel" supported near 0RN0\in \R^N. A main example is when KK is a "product kernel." We also study maximal operators of the form, Mf(x)=ψ(x)sup0<δ1,...,δN<<1t<1f(γδ1t1,...,δNtN(x))dt. \mathcal{M} f(x) = \psi(x)\sup_{0<\delta_1,..., \delta_N<<1} \int_{|t|<1} |f(\gamma_{\delta_1 t_1,...,\delta_N t_N}(x))|\: dt. We show that M\mathcal{M} is bounded on LpL^p (1<p1<p\leq \infty). We give conditions on γ\gamma under which TT is bounded on LpL^p (1<p<1<p<\infty); these conditions hold automatically when KK is a Calder\'on-Zygmund kernel. This is the final paper in a three part series. The first two papers consider the more general case when γ\gamma is CC^\infty.

Keywords

Cite

@article{arxiv.1105.4589,
  title  = {Multi-parameter singular Radon transforms III: real analytic surfaces},
  author = {Elias M. Stein and Brian Street},
  journal= {arXiv preprint arXiv:1105.4589},
  year   = {2011}
}

Comments

22 pages, part 3 in a three part series

R2 v1 2026-06-21T18:11:22.428Z