A multilinear generalisation of the Cauchy-Schwarz inequality

Anthony Carbery

Type: Article

Publication Date: 2004-06-16

Citations: 9

DOI: https://doi.org/10.1090/s0002-9939-04-07565-3

Abstract

We prove a multilinear inequality which in the bilinear case reduces to the Cauchy-Schwarz inequality. The inequality is combinatorial in nature and is closely related to one established by Katz and Tao in their work on dimensions of Kakeya sets. Although the inequality is âelementary" in essence, the proof given is genuinely analytical insofar as limiting procedures are employed. Extensive remarks are made to place the inequality in context.

Locations

Proceedings of the American Mathematical Society - View - PDF

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+	Introduction to Fourier Analysis on Euclidean Spaces.	1971	Elias M. Stein Guido Weiss
+	Best constants in Young's inequality, its converse, and its generalization to more than three functions	1976	H. J. Brascamp Élliott H. Lieb
+	Gaussian kernels have only Gaussian maximizers	1990	Élliott H. Lieb
+	Sharp inequalities and geometric manifolds	1997	William Beckner
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+	Inequalities in Fourier Analysis	1975	William Beckner
+ PDF Chat	Bounds on arithmetic projections, and applications to the Kakeya conjecture	1999	Nets Hawk Katz Terence Tao
+	2. Geometric Inequalities in Fourier Analysis	1995	William Beckner
+	A general rearrangement inequality for multiple integrals	1974	H. J. Brascamp Élliott H. Lieb J. M. Luttinger
+	A remark on an inequality of Katz and Tao	2003	Anthony Carbery