ON THE NONLINEAR BRASCAMP-LIEB INEQUALITY

JONATHAN BENNETT; NEAL BEZ; STEFAN BUSCHENHENKE; MICHAEL G. COWLING; TARYN C. FLOCK

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ON THE NONLINEAR BRASCAMP-LIEB INEQUALITY

机译：关于非线性束缚 - LIEB不平等

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摘要

We prove a nonlinear variant of the general Brascamp-Lieb inequality. Our proof consists of running an efficient, or "tight," induction-on-scales argument, which uses the existence of Gaussian near-extremizers to the underlying linear Brascamp-Lieb inequality (Lieb's theorem) in a fundamental way. A key ingredient is an effective version of Lieb's theorem, which we establish via a careful analysis of near-minimizers of weighted sums of exponential functions. Instances of this inequality are quite prevalent in mathematics, and we illustrate this with some applications in harmonic analysis.

机译：我们证明了一般Brascamp-Lieb不等式的一个非线性变体。我们的证明包括运行一个有效的，或“紧密的”，规模上的归纳论点，它使用高斯近极值的存在性，以基本的方式对基础的线性Brascamp-Lieb不等式（Lieb定理）。一个关键因素是Lieb定理的有效版本，我们通过仔细分析指数函数加权和的近似极小值来建立该定理。这种不等式的例子在数学中非常普遍，我们用调和分析中的一些应用来说明这一点。

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来源
《Duke mathematical journal》 |2020年第17期|共48页
作者
JONATHAN BENNETT; NEAL BEZ; STEFAN BUSCHENHENKE; MICHAEL G. COWLING; TARYN C. FLOCK;
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作者单位

School of Mathematics University of Birmingham Birmingham United Kingdom;

Department of Mathematics Graduate School of Science and Engineering Saitama University Saitama Japan;

Mathematisches Seminar Christian-Albrechts-Universit?t zu Kiel Kiel Germany;

School of Mathematics and Statistics University of New South Wales Sydney New South Wales Australia;

Department of Mathematics and Statistics University of Massachusetts Amherst Massachusetts USA;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
nonlinear variant; Brascamp-Lieb; proof consists;

机译：非线性变体;Brascamp-Lieb;证明包括;

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8. Perturbed Brascamp-Lieb inequalities and application to Parsell-Vinogradov systems [D] . Zhang, Ruixiang. 2017

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9. A Forward-Reverse Brascamp-Lieb Inequality: Entropic Duality and Gaussian Optimality [O] . Jingbo Liu, Thomas A. Courtade, Paul W. Cuff, 2018

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11. Regularization of nonlinear variational inequalities involved by J-monotone operators [R] . Nguyen Quynh Nga, Nguyen Minh Chuong 1995

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ON THE NONLINEAR BRASCAMP-LIEB INEQUALITY

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