English

Bloom type inequality for bi-parameter singular integrals: efficient proof and iterated commutators

Classical Analysis and ODEs 2019-03-18 v3

Abstract

Utilising some recent ideas from our bilinear bi-parameter theory, we give an efficient proof of a two-weight Bloom type inequality for iterated commutators of linear bi-parameter singular integrals. We prove that if TT is a bi-parameter singular integral satisfying the assumptions of the bi-parameter representation theorem, then [bk,[b2,[b1,T]]]Lp(μ)Lp(λ)[μ]Ap,[λ]Api=1kbibmo(νθi), \| [b_k,\cdots[b_2, [b_1, T]]\cdots]\|_{L^p(\mu) \to L^p(\lambda)} \lesssim_{[\mu]_{A_p}, [\lambda]_{A_p}} \prod_{i=1}^k\|b_i\|_{\operatorname{bmo}(\nu^{\theta_i})} , where p(1,)p \in (1,\infty), θi[0,1]\theta_i \in [0,1], i=1kθi=1\sum_{i=1}^k\theta_i=1, μ,λAp\mu, \lambda \in A_p, ν:=μ1/pλ1/p\nu := \mu^{1/p}\lambda^{-1/p}. Here ApA_p stands for the bi-parameter weights in Rn×Rm\mathbb{R}^n \times \mathbb{R}^m and bmo(ν)\operatorname{bmo}(\nu) is a suitable weighted little BMO space. We also simplify the proof of the known first order case.

Keywords

Cite

@article{arxiv.1806.02742,
  title  = {Bloom type inequality for bi-parameter singular integrals: efficient proof and iterated commutators},
  author = {Kangwei Li and Henri Martikainen and Emil Vuorinen},
  journal= {arXiv preprint arXiv:1806.02742},
  year   = {2019}
}

Comments

v3: Incorporated referee comments, to appear in Int. Math. Res. Not. IMRN

R2 v1 2026-06-23T02:22:37.854Z