解析数论

我们的结果包括了解析数论中的两个重要的经典结论：一是I。

Our result consists two important classical conclusions in analytic number theory . The first is I.

陈景润在孪生素数猜想和哥德巴赫猜想方面所做的工作推动了解析数论的发展。

His work on the twin prime conjecture and on Goldbach 's conjecture led to progress in the analytic number theory .

解析数论的四个基本公式及其初步应用

Four basic formula of the analytic theory of numbers and their preliminary application

如何评估并减小这种误差，是解析数论的一个重要问题。

Deducing the effect of such errors and minimising them was an important aspect of numerical analysis .

解析数论非常幸运还有一个最为有名的未解决的问题，即黎曼假设。

Analytic number theory is fortunate to have one of the most famous unsolved problems , the Riemann hypothesis .

本文用初等方法证明了解析数论中的两个有趣结果

In this paper , it is proved that two interesting result in elementary analytic theory of numbers by method of primary

本文主要讨论线性素变数方程的可解性问题，这是经典解析数论研究的重要问题之一。

In this thesis we consider the solubility problem of linear equations , which is one important problem in classical analytic number theory .

这是一个更为抽象的问题，并形成了一个称为“解析数论”的数学分支注。

but the problem of how best to organise the work was a more abstract question , one constituting the branch of mathematics called ' numerical analysis ' .

众所周知，算术函数的均值估计问题在解析数论研究中占有十分重要的位置，许多著名的数论难题都与之密切相关。

It is well known that the mean value problems of arithmetical functions play an important role in the study of analytic number theory , and they relate to many famous number theoretic problems .