Results 171 to 180 of about 14,263 (192)

The disc as a bilinear multiplier

American Journal of Mathematics, 2006
A classical theorem of C. Fefferman says that the characteristic function of the unit disc is not a Fourier multiplier on L p ( R 2 ) unless p = 2. In this article we obtain a result that brings a contrast with the previous theorem. We show that the characteristic function of the unit disc in R 2 is the Fourier multiplier of a bounded bilinear ...
Loukas Grafakos, Xiaochun Li
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Bilinear Multipliers of Small Lebesgue spaces

2020
Let $G$ be a locally compact abelian metric group with Haar measure $ $ and $\hat{G}$ its dual with Haar measure $ ,$ and $ ( G) $ is finite.
Kulak, ��znur, G��rkanl��, A. Turan   +1 more
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Weighted Leibniz-type rules for bilinear flag multipliers

Banach Journal of Mathematical Analysis, 2021
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Jiexing Yang, Zongguang Liu, Xinfeng Wu
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Bilinear square spectral multipliers on stratified groups

Journal of Pseudo-Differential Operators and Applications, 2019
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Fang, Jingxuan, Zhao, Jiman
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Weighted Fractional Leibniz-Type Rules for Bilinear Multiplier Operators

Potential Analysis, 2018
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Joshua Brummer, Virginia Naibo
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A bilinear approach to cone multipliers I. Restriction estimates

Geometric And Functional Analysis, 2000
Let \(S_1\) and \(S_2\) be two smooth compact hypersurfaces with boundary in \(\mathbb{R}^3\), with Lebesgue measure \(d\sigma_1\) and \(d\sigma_2\), respectively. If \(0< p,q\leq\infty\), one says that the bilinear adjoint restriction estimate \(R^*_{S_1,S_2}(p\times p\to q)\) holds if \[ \Biggl\|\prod^2_{t=1} (f^\wedge_t d\sigma_t)\Biggr\|_{L^q ...
Tao, Terence C., Vargas, Ana M.
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Linear and Bilinear Multiplier Operators for the Dunkl Transform

Mediterranean Journal of Mathematics, 2010
The paper treats the problem of \(L^p\) estimates for linear and bilinear multiplier operators for the Dunkl transform in the one dimensional case. Using Hörmander's technique and an explicit formula for the Dunkl translation operator, an analogue of the celebrated Hörmander multiplier theorem is proved in the Dunkl setting.
Amri, Bechir, Gasmi, Abdessalem, Sifi, Mohamed   +2 more
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Weighted norm inequalities for bilinear flag Fourier multipliers

Studia Mathematica, 2018
Summary: This paper proves weighted norm inequalities for bilinear flag Fourier multipliers with limited regularity, which extends some results of \textit{D. S. Kurtz} and \textit{R. L. Wheeden} [Trans. Am. Math. Soc. 255, 343--362 (1979; Zbl 0427.42004)], \textit{M. Fujita} and \textit{N. Tomita} [Trans. Am. Math. Soc. 364, No.
Zhang, Xiaojin, Liu, Zongguang
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Weighted compact commutator of bilinear Fourier multiplier operator

Chinese Annals of Mathematics, Series B, 2017
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Bilinear Bochner–Riesz Square Function and Applications

Journal of Fourier Analysis and Applications, 2023
Saurabh Shrivastava, Kalachand Shuin
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