Weighted Norm Inequalities for Rough Singular Integral Operators

Li, Kangwei; Pérez, Carlos; Rivera-Rı́os, Israel P.; Roncal, Luz

doi:10.1007/s12220-018-0085-4

“…The purpose of the following sections we will be settling (3.1) for the operators in the main theorems. To achieve in that task we will rely upon sparse domination results, and more in particular we will use suitable splittings of the sparse families involved in the spirit of [8,23,25].…”

Section: Proofs Of the Main Resultsmentioning

confidence: 99%

“…where g ≃ χ G . Then for s = 1 + 1 2τn[uv] A∞ , notice that, arguing as in [25] (uv) s (G ∩ Q) (uv) s (Q)…”

Section: 32mentioning

confidence: 99%

“…

In this paper we provide some quantitative mixed-type estimates assuming conditions that imply that uv ∈ A∞ for Calderón-Zygmund operators, rough singular integrals and commutators. The main novelty of this paper lies in the fact that we rely upon sparse domination results, pushing an approach to endpoint estimates that was introduced in [8] and extended in [23] and [25]Sawyer also conjectured that (1.1) should hold as well for the Hilbert transform. Cruz-Uribe, Martell and Pérez [7] generalized (1.1) to higher dimensions and actually proved that Sawyer's conjecture holds for Calderón-Zygmund operators via the following extrapolation argument.Theorem C. Assume that for every w ∈ A ∞ and some 0 < p < ∞,Then for every u ∈ A 1 and everyThe conditions on the weights in that extrapolation result lead them to conjecture that (1.1), and consequently the corresponding estimate for Calderón-Zygmund operators should hold as well with u ∈ A 1 and v ∈ A ∞ .

…”

mentioning

confidence: 99%

“…In this paper we provide some quantitative mixed-type estimates assuming conditions that imply that uv ∈ A∞ for Calderón-Zygmund operators, rough singular integrals and commutators. The main novelty of this paper lies in the fact that we rely upon sparse domination results, pushing an approach to endpoint estimates that was introduced in [8] and extended in [23] and [25]…”

mentioning

confidence: 99%

See 2 more Smart Citations

A sparse approach to mixed weak type inequalities

Caldarelli

¹

,

Rivera-Rı́os

²

2019

Self Cite

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In this paper we provide some quantitative mixed-type estimates assuming conditions that imply that uv ∈ A∞ for Calderón-Zygmund operators, rough singular integrals and commutators. The main novelty of this paper lies in the fact that we rely upon sparse domination results, pushing an approach to endpoint estimates that was introduced in [8] and extended in [23] and [25]Sawyer also conjectured that (1.1) should hold as well for the Hilbert transform. Cruz-Uribe, Martell and Pérez [7] generalized (1.1) to higher dimensions and actually proved that Sawyer's conjecture holds for Calderón-Zygmund operators via the following extrapolation argument.Theorem C. Assume that for every w ∈ A ∞ and some 0 < p < ∞,Then for every u ∈ A 1 and everyThe conditions on the weights in that extrapolation result lead them to conjecture that (1.1), and consequently the corresponding estimate for Calderón-Zygmund operators should hold as well with u ∈ A 1 and v ∈ A ∞ . That conjecture was positively answered recently in [24] where several quantitative estimates were provided as well. At this point we would like to mention, as well, a recent generalization provided for Orlicz maximal operators in [2].In [7], besides the aforementioned results, it was shown that (1.1) holds if u ∈ A 1 and v ∈ A ∞ (u) (see Section 2.2 for the precise definition of A p (u)). The advantage of that condition is that the product uv is an A ∞ weight. Over the past few years, there have been new contributions under those assumptions such as [3] for the case of fractional integrals and related operators, [28,29] for related quantitative estimates and [26] for multilinear extensions.

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“…Suppose that for any r ∈ (1, 2), and any bounded function f with compact support, there exists a sparse family of cubes S, such that for any function g ∈ L 1 (R d ), Added in Proof. After this paper was prepared, we learned that Li et al [31] established the quantitative weighted bounds for linear operators satisfying the assumptions in Theorem 4.5 with β = 0 (where the bilinear sparse domination is given in the form (3.13)), which coincides the conclusion in Theorem 4.5 for β = 0. The argument in [31] is different from the argument in the proof of Theorem 4.5 and is of independent interest.…”

Section: Proof Of Theorem 11mentioning

confidence: 86%

On the Composition of Rough Singular Integral Operators

Hu

¹

,

Lai

²

,

Xue

³

2020

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In this paper, we investigate the behavior of the bounds of the composition for rough singular integral operators on the weighted space. More precisely, we obtain the quantitative weighted bounds of the composition operator for two singular integral operators with rough homogeneous kernels on L p (R d , w), p ∈ (1, ∞), which is smaller than the product of the quantitative weighted bounds for these two rough singular integral operators. Moreover, at the endpoint p = 1, the L log L weighted weak type bound is also obtained, which may have its own interest in the theory of rough singular integral even in the unweighted case. A slightly better bilinear sparse domination is established for obtaining the quantitative weighted bounds.2010 Mathematics Subject Classification. Primary 42B20, Secondary 47B33. Key words and phrases. Rough singular integral operator, composite operator, weighted bound, bilinear sparse operator.

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