$A Weighted Pr\'ekopa-Leindler inequality and sumsets with quasicubes$

A Weighted Pr\'ekopa-Leindler inequality and sumsets with quasicubes

We give a short, self-contained proof of two key results from a paper of four of the authors. The first is a kind of weighted discrete Pr\'ekopa-Leindler inequality. This is then applied to show that if $A, B \subseteq \mathbb{Z}^d$ are finite sets and $U$ is a subset of a "quasicube"...

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Hauptverfasser:	Green, Ben, Matolcsi, Dávid, Ruzsa, Imre, Shakan, George, Zhelezov, Dmitrii
Format:	Artikel
Sprache:	eng
Schlagworte:	Mathematics - Combinatorics Mathematics - Number Theory
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Beschreibung
Zusammenfassung:	We give a short, self-contained proof of two key results from a paper of four of the authors. The first is a kind of weighted discrete Pr\'ekopa-Leindler inequality. This is then applied to show that if $A, B \subseteq \mathbb{Z}^d$ are finite sets and $U$ is a subset of a "quasicube" then $\|A + B + U\| \geq \|A\|^{1/2} \|B\|^{1/2} \|U\|$. This result is a key ingredient in forthcoming work of the fifth author and P\"alv\"olgyi on the sum-product phenomenon.
DOI:	10.48550/arxiv.2003.04077