English

$L^{p}$ estimates for bilinear and multi-parameter Hilbert transforms

Classical Analysis and ODEs 2016-01-20 v1

Abstract

C. Muscalu, J. Pipher, T. Tao and C. Thiele proved in \cite{MPTT1} that the standard bilinear and bi-parameter Hilbert transform does not satisfy any LpL^{p} estimates. They also raised a question asking if a bilinear and bi-parameter multiplier operator defined by Tm(f1,f2)(x):=R4m(ξ,η)f1^(ξ1,η1)f2^(ξ2,η2)e2πix((ξ1,η1)+(ξ2,η2))dξdη T_{m}(f_{1},f_{2})(x):=\int_{\mathbb{R}^{4}}m(\xi,\eta)\hat{f_{1}}(\xi_{1},\eta_{1})\hat{f_{2}}(\xi_{2},\eta_{2})e^{2\pi ix\cdot((\xi_{1},\eta_{1})+(\xi_{2},\eta_{2}))}d\xi d\eta satisfies any LpL^p estimates, where the symbol mm satisfies ξαηβm(ξ,η)1dist(ξ,Γ1)α1dist(η,Γ2)β |\partial_{\xi}^{\alpha}\partial_{\eta}^{\beta}m(\xi,\eta)|\lesssim\frac{1}{dist(\xi,\Gamma_{1})^{|\alpha|}}\cdot\frac{1}{dist(\eta,\Gamma_{2})^{|\beta|}} for sufficiently many multi-indices α=(α1,α2)\alpha=(\alpha_{1},\alpha_{2}) and β=(β1,β2)\beta=(\beta_{1},\beta_{2}), Γi\Gamma_{i} (i=1,2i=1,2) are subspaces in R2\mathbb{R}^{2} and dimΓ1=0,dimΓ2=1dim \, \Gamma_{1}=0, \, dim \, \Gamma_{2}=1. P. Silva answered partially this question in \cite{S} and proved that TmT_{m} maps Lp1×Lp2LpL^{p_1}\times L^{p_2}\rightarrow L^{p} boundedly when 1p1+1p2=1p\frac{1}{p_1}+\frac{1}{p_2}=\frac{1}{p} with p1,p2>1p_1, p_2>1, 1p1+2p2<2\frac{1}{p_1}+\frac{2}{p_2}<2 and 1p2+2p1<2\frac{1}{p_2}+\frac{2}{p_1}<2. One observes that the admissible range here for these tuples (p1,p2,p)(p_1,p_2,p) is a proper subset contained in the admissible range of BHT. In this paper, we establish the same LpL^{p} estimates as BHT in the full range for the bilinear and multi-parameter Hilbert transforms with arbitrary symbols satisfying appropriate decay assumptions (Theorem 1.3). Moreover, we also establish the same LpL^p estimates as BHT for certain modified bilinear and bi-parameter Hilbert transforms with dimΓ1=dimΓ2=1dim \, \Gamma_{1}=dim \, \Gamma_{2}=1 but with a slightly better decay than that for the bilinear and bi-parameter Hilbert transform (Theorem 1.4).

Keywords

Cite

@article{arxiv.1403.0624,
  title  = {$L^{p}$ estimates for bilinear and multi-parameter Hilbert transforms},
  author = {Wei Dai and Guozhen Lu},
  journal= {arXiv preprint arXiv:1403.0624},
  year   = {2016}
}

Comments

37 pages

R2 v1 2026-06-22T03:19:29.640Z