On Pointwise $$\ell ^r$$-Sparse Domination in a Space of Homogeneous Type

Lorist, Emiel

doi:10.1007/s12220-020-00514-y

Cited by 29 publications

(67 citation statements)

References 75 publications

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“…In this theorem a localized r -estimate is imposed on T to deduce (6.3) with q 0 = r . The localized r -estimate for T becomes weaker for smaller r , so [35,Theorem 3.5] also yields the result of Conjecture 6.2. • One of the main results in [10] is (6.3) with q 0 = 1 for rough homogeneous singular operators T , see also [27] for an alternative proof.…”

Section: Vector-valued Estimates In the Quasi-banach Rangementioning

confidence: 76%

Sparse domination implies vector-valued sparse domination

Lorist

Nieraeth

2022

Math. Z.

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We prove that scalar-valued sparse domination of a multilinear operator implies vector-valued sparse domination for tuples of quasi-Banach function spaces, for which we introduce a multilinear analogue of the $${{\,\mathrm{UMD}\,}}$$ UMD condition. This condition is characterized by the boundedness of the multisublinear Hardy-Littlewood maximal operator and goes beyond examples in which a $${{\,\mathrm{UMD}\,}}$$ UMD condition is assumed on each individual space and includes e.g. iterated Lebesgue, Lorentz, and Orlicz spaces. Our method allows us to obtain sharp vector-valued weighted bounds directly from scalar-valued sparse domination, without the use of a Rubio de Francia type extrapolation result. We apply our result to obtain new vector-valued bounds for multilinear Calderón-Zygmund operators as well as recover the old ones with a new sharp weighted bound. Moreover, in the Banach function space setting we improve upon recent vector-valued bounds for the bilinear Hilbert transform.

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Section: Vector-valued Estimates In the Quasi-banach Rangementioning

confidence: 76%

Sparse domination implies vector-valued sparse domination

Lorist

Nieraeth

2022

Math. Z.

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“…Our key novel point is the language in which our main results are written. This language unifies (1.1) with all of the results contained in [37, 39]. More important, it allows us to deal with many non-operator objects, which have not yet been investigated using sparse domination techniques.…”

Section: Introductionmentioning

confidence: 78%

“…Primarily motivated by sharp quantitative weighted norm inequalities, sparse domination has quickly transformed into a very active area, dealing with various operators within and beyond the Calderón–Zygmund theory. During the last five years, a number of sparse domination principles (that is, general results establishing sparse domination for a given class of operators) have appeared, for example, in the works [2, 5, 6, 8, 13, 14, 34, 35, 37, 39].…”

Section: Introductionmentioning

confidence: 99%

“…The proof of the pointwise sparse domination result for T was subsequently simplified by the first author in [34] and the first and third authors in [37], in which a general sparse domination principle was established, allowing one to deal with a vast number of ‘smooth’ operators. The main result of [37] was then extended by the second author [39] into several directions, including the setting of vector-valued functions on spaces of homogeneous type, along with the concept of -sparse domination.…”

Section: Introductionmentioning

confidence: 99%

“…In the present article, we return sparse domination to its roots, using functions rather than operators. We will essentially use the techniques developed in [37, 39]. Our key novel point is the language in which our main results are written.…”

Section: Introductionmentioning

confidence: 99%

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Operator-free sparse domination

Lerner

Lorist

Ombrosi

2022

Forum of Mathematics, Sigma

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We obtain a sparse domination principle for an arbitrary family of functions $f(x,Q)$ , where $x\in {\mathbb R}^{n}$ and Q is a cube in ${\mathbb R}^{n}$ . When applied to operators, this result recovers our recent works [37, 39]. On the other hand, our sparse domination principle can be also applied to non-operator objects. In particular, we show applications to generalised Poincaré–Sobolev inequalities, tent spaces and general dyadic sums. Moreover, the flexibility of our result allows us to treat operators that are not localisable in the sense of [39], as we will demonstrate in an application to vector-valued square functions.

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Mixed weak‐type inequalities in Euclidean spaces and in spaces of the homogeneous type

Ibañez‐Firnkorn,

Rivera‐Ríos

2023

Mathematische Nachrichten

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In this paper, we provide mixed weak‐type inequalities generalizing previous results in an earlier work by Caldarelli and the second author and also in the spirit of earlier results by Lorente et al. One of the main novelties is that, besides obtaining estimates in the Euclidean setting, results are provided as well in spaces of the homogeneous type, being the first mixed weak‐type estimates that we are aware of in that setting.

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On Pointwise $$\ell ^r$$-Sparse Domination in a Space of Homogeneous Type

Cited by 29 publications

References 75 publications

Sparse domination implies vector-valued sparse domination

Sparse domination implies vector-valued sparse domination

Operator-free sparse domination

Mixed weak‐type inequalities in Euclidean spaces and in spaces of the homogeneous type

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