黎曼假设的快速新证明

IF 0.2 Q4 MATHEMATICS
Jean-Max Coranson-Beaudu
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引用次数: 1

摘要

本文证明了黎曼函数(xi)包含黎曼函数(zeta)是全纯的,并表示为与它们的零点及其共轭的收敛无限多项式积。我们的工作将在非平凡零存在的临界带上进行。我们的方法是利用幂级数和全纯函数的无穷积分解的性质。我们从Weierstrass方法中得到启发,构造了一个收敛的无穷积模型,其零点为zeta函数的零点。通过应用函数xi的对称泛函方程,我们推导出函数xi的每一个零和它的共轭之间的关系。由于无穷积的收敛性,以及该无穷积的二阶初等多项式不可约到复集合中,因此可以很好地确定这个关系。显而易见的简单推理是基于阿达玛德和米塔格-莱弗勒的基本定理。我们得到了所寻求的结果:所有0的实部等于1 / 2。本文证明了黎曼假设是正确的。我们下一篇文章的观点是将这种方法应用于狄利克雷级数,作为黎曼函数的推广。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
A Speedy New Proof of the Riemann's Hypothesis
In this paper we show that Riemann's function (xi), involving the Riemann’s (zeta) function, is holomorphic and is expressed as a convergent infinite polynomial product in relation to their zeros and their conjugates. Our work will be done on the critical band in which non-trivial zeros exist. Our approach is to use the properties of power series and infinite product decomposition of holomorphic functions. We take inspiration from the Weierstrass method to construct an infinite product model which is convergent and whose zeros are the zeros of the zeta function. By applying the symetric functional equation of the xi function we deduce a relation between each zero of the function xi and its conjugate. Because of the convergence of the infinite product, and that the elementary polynomials of the second degree of this same product are irreducible into the complex set, then this relation is well determined. The apparent simplicity of the reasoning is based on the fundamental theorems of Hadamard and Mittag-Leffler. We obtain the sought result: the real part of all zeros is equal to ½. This article proves that the Riemann’ hypothesis is true. Our perspectives for a next article are to apply this method to Dirichlet series, as a generalization of the Riemann function.
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来源期刊
CiteScore
0.60
自引率
0.00%
发文量
2
期刊介绍: The “Italian Journal of Pure and Applied Mathematics” publishes original research works containing significant results in the field of pure and applied mathematics.
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