临界线上Riemann Zeta函数峰值的快速定位方法

Norbert Tihanyi
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引用次数: 5

摘要

本文提出了一种新的RS-PEAK算法,用于定位临界线上的黎曼ζ函数的峰值。该方法基于Andrew M. Odlyzko, Tadej Kotnik的早期结果,以及最近获得的解决同时丢芬图近似问题的结果。直到2014年,已知的Riemann-Siegel Z函数(即Z(t))大于1000的值只有几百个,主要是由Ghaith Ayesh Hiary和Jonathan Bober发现的。通过应用RS-PEAK算法,可以在单个桌面PC上在几个小时内产生数千个大值,其中|Z(t)| > 1000。本文的目的是描述RS-PEAK算法,通过该算法可以生成许多大的Z(t)值,以便能够揭示Riemann zeta函数的新行为。使用RS-PEAK在两周的时间内发现了超过20,000个值,其中|Z(t)| > 1000。已知最大的Z(t)值表示为log |Z(t)|/log(t) > 32=205。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Fast Method for Locating Peak Values of the Riemann Zeta Function on the Critical Line
In this paper a new algorithm RS-PEAK will be presented for locating peak values of the Riemann zeta function on the critical line. The method based on earlier results of Andrew M. Odlyzko, Tadej Kotnik, and on a recently achieved results of solving simultaneous Diophantine approximation problems. Until 2014 only a few hundred values were known where the Riemann-Siegel Z-function (i.e: Z(t)) larger than 1000, mainly found by Ghaith Ayesh Hiary and Jonathan Bober. By applying the algorithm RS-PEAK thousands of large values can be produced where |Z(t)| > 1000 within a few hours on a single desktop PC. The aim of this paper is to describe the RS-PEAK algorithm by which many large values of Z(t) can be generated in order to be able to reveal new behaviours of the Riemann zeta function. Using RS-PEAK more than 20 000 values had been found during a two weeks period where |Z(t)| > 1000. The largest known Z(t) values are presented where log |Z(t)|/log(t) > 32=205.
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