English

Littlewood-Paley-Stein functionals: an R-boundedness approach

Analysis of PDEs 2022-12-07 v3 Functional Analysis

Abstract

Let L=Δ+VL = \Delta + V be a Schr\"odinger operator with a non-negative potential VV on a complete Riemannian manifold MM. We prove that the vertical Littlewood-Paley-Stein functional associated with LL is bounded on Lp(M)L^p(M) {\it if and only if} the set {tetL,t>0}\{\sqrt{t}\, \nabla e^{-tL}, \, t > 0\} is R{\mathcal R}-bounded on Lp(M)L^p(M). We also introduce and study more general functionals. For a sequence of functions mk:[0,)Cm_k : [0, \infty) \to \mathbb{C}, we define H((fk)):=(k0mk(tL)fk2dt)1/2+(k0Vmk(tL)fk2dt)1/2.H((f_k)) := \Big( \sum_k \int_0^\infty | \nabla m_k(tL) f_k |^2 dt \Big)^{1/2} + \Big( \sum_k \int_0^\infty | \sqrt{V} m_k(tL) f_k |^2 dt \Big)^{1/2}. Under fairly reasonable assumptions on MM we prove boundedness of HH on Lp(M)L^p(M) in the sense H((fk))pC(kfk2)1/2p\| H((f_k)) \|_p \le C\, \Big\| \Big( \sum_k |f_k|^2 \Big)^{1/2} \Big\|_p for some constant CC independent of (fk)k(f_k)_k. A lower estimate is also proved on the dual space LpL^{p'}. We introduce and study boundedness of other Littlewood-Paley-Stein type functionals and discuss their relationships to the Riesz transform. Several examples are given in the paper.

Keywords

Cite

@article{arxiv.2007.00284,
  title  = {Littlewood-Paley-Stein functionals: an R-boundedness approach},
  author = {Thomas Cometx and El Maati Ouhabaz},
  journal= {arXiv preprint arXiv:2007.00284},
  year   = {2022}
}

Comments

Improved version of Theorem 4.1 and several typos corrected. Final version to appear in Ann. Institut Fourier

R2 v1 2026-06-23T16:45:38.612Z