Entropy bump conditions for fractional maximal and integral operators

Rahm, Robert; Spencer, Scott

doi:10.1515/conop-2016-0013

Cited by 4 publications

(6 citation statements)

References 16 publications

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“…This was extended to the general p = q case by Lacey-Spencer in [9]. These operators were also studied in the off-diagonal p ≤ q, α > 0 setting in [16,18]. Our theorem here is "sharp" in the sense that when σ and w are A ∞ , we recover the sharp results of, for example [2,3,7].…”

Section: Background and Discussionsupporting

confidence: 70%

“…The topic of this article is two-weight bump conditions for sparse operators in the "offdiagonal" setting (i.e q > p). We continue the line of investigation concerning entropy bumps that began with Treil-Volberg in [21] and was continued in [9,18,19] and the line of investigation concerning "direct comparison bumps" introduced in [19] and continued and improved in [10]. We will be concerned with sparse operators of the form ( 0 ≤ α < d):…”

Section: Introductionmentioning

confidence: 99%

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Off-Diagonal Two Weight Bumps for Fractional Sparse Operators

Rahm¹

2021

Preprint

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In this paper, we continue some recent work on two weight boundedness of sparse operators to the "off-diagonal" setting. We use the new "entropy bumps" introduced in by Treil-Volberg ([21]) and improved by Lacey-Spencer ([9]) and the "direct comparison bumps" introduced by Rahm-Spencer ([19]) and improved by Lerner ([10]). Our results are "sharp" in the sense that they are sharp in various particular cases. A feature is that given the current machinery, the proofs are almost trivial.

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Section: Background and Discussionsupporting

confidence: 70%

Section: Introductionmentioning

confidence: 99%

Off-Diagonal Two Weight Bumps for Fractional Sparse Operators

Rahm¹

2021

Preprint

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“…The following was proven by one of us and Scott Spencer [34]. Below, for a weight w we define ρ w (Q) := 1 w(Q) ˆQ(M(wQ))(x)dx.…”

Section: Discussionmentioning

confidence: 94%

$A_p$ weights and Quantitative Estimates in the Schrödinger Setting

Li¹,

Rahm²,

Wick³

2016

Preprint

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Suppose L = −∆ + V is a Schrödinger operator on R n with a potential V belonging to certain reverse Hölder class RH σ with σ ≥ n/2. The aim of this paper is to study the A p weights associated to L, denoted by A L p , which is a larger class than the classical Muckenhoupt A p weights. We first prove the quantitative A L p bound for the maximal function and the maximal heat semigroup associated to L. Then we further provide the quantitative A L p,q bound for the fractional integral operator associated to L. We point out that all these quantitative bounds are known before in terms of the classical A p,q constant. However, since A p,q ⊂ A L p,q , the A L p,q constants are smaller than A p,q constant. Hence, our results here provide a better quantitative constant for maximal functions and fractional integral operators associated to L. Next, we prove two-weight inequalities for the fractional integral operator; these have been unknown up to this point. Finally we also have a study on the "exp-log" link between A L p and BMO L (the BMO space associated with L), and show that for w ∈ A L p , log w is in BMO L , and that the reverse is not true in general.

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“…• Orlicz norm bumps, studied among others in [CUMP12, Ler13, CUM13a, CUM13b, CU17], with early history in [Neu83, Pér94a, Pér94b]; • testing conditions, pioneered in [Saw82,Saw88], with a recent culmination in [LSSUT14,Lac14]; and • entropy bumps, recently introduced in [TV16] and studied in [LS15,RS16]. However, an in-depth discussion of any of these topics would take us too far afield.…”

Section: Introductionmentioning

confidence: 99%

Off-diagonal sharp two-weight estimates for sparse operators

Fackler,

Hytönen

2017

Preprint

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Entropy bump conditions for fractional maximal and integral operators

Cited by 4 publications

References 16 publications

Off-Diagonal Two Weight Bumps for Fractional Sparse Operators

Off-Diagonal Two Weight Bumps for Fractional Sparse Operators

$A_p$ weights and Quantitative Estimates in the Schrödinger Setting

Off-diagonal sharp two-weight estimates for sparse operators

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