带数字限制的整数上的Weyl和

Pub Date : 2021-05-11 DOI:10.1307/mmj/20216094

I. Shparlinski, J. Thuswaldner

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引用次数: 2

摘要

我们估计整数上的Weyl和，其中二进制数的和是固定的或受某些同余条件的限制。在我们的证明中，我们使用的思想可以追溯到Banks, Conflitti和第一作者(2002)的一篇论文。此外，我们将“主猜想”应用于由Bourgain, Demeter和Guth(2016)以及Wooley(2016, 2019)建立的Vinogradov中值定理。我们用我们的结果给出了点集的差异估计，这些点集是由多项式的值所定义的，这些多项式的值以不同的方式限制了二进制数的和。

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Weyl Sums over Integers with Digital Restrictions

We estimate Weyl sums over the integers with sum of binary digits either fixed or restricted by some congruence condition. In our proofs we use ideas that go back to a paper by Banks, Conflitti and the first author (2002). Moreover, we apply the “main conjecture” on the Vinogradov mean value theorem which has been established by Bourgain, Demeter and Guth (2016) as well as by Wooley (2016, 2019). We use our result to give an estimate of the discrepancy of point sets that are defined by the values of polynomials at arguments having the sum of binary digits restricted in different ways.

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