具有二次增长的四变量扩展器族

Q4 Mathematics

Moscow Journal of Combinatorics and Number Theory Pub Date : 2018-05-11 DOI:10.2140/moscow.2019.8.143

Mehdi Makhul

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引用次数: 0

摘要

我们证明了如果$g(x,y)$是一个常次多项式$d$, $y_2-y_1$不能除$g(x_1,y_1)-g(x_2,y_2)$，那么对于任意有限集$A \subset \mathbb{R}$\[ |X| \gg_d |A|^2, \quad \text{where} \ X:=\left\{\frac{g(a_1,b_1)-g(a_2,b_2)}{b_2-b_1} :\, a_1,a_2,b_1,b_2 \in A \right\}. \]我们将看到这个界对于某些多项式$g(x,y)$也是紧的。

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A family of four-variable expanders with quadratic growth

We prove that if $g(x,y)$ is a polynomial of constant degree $d$ that $y_2-y_1$ does not divide $g(x_1,y_1)-g(x_2,y_2)$, then for any finite set $A \subset \mathbb{R}$ \[ |X| \gg_d |A|^2, \quad \text{where} \ X:=\left\{\frac{g(a_1,b_1)-g(a_2,b_2)}{b_2-b_1} :\, a_1,a_2,b_1,b_2 \in A \right\}. \] We will see this bound is also tight for some polynomial $g(x,y)$.

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来源期刊

Moscow Journal of Combinatorics and Number Theory Mathematics-Algebra and Number Theory

CiteScore

0.80

自引率

0.00%

发文量