【摘要】：素?cái)?shù)規(guī)律不能精確地描述,但可以用閾值的方式對(duì)素?cái)?shù)規(guī)律進(jìn)行描述。本文介紹了一個(gè)迄今最緊湊的素?cái)?shù)分布定律:在連續(xù)奇素?cái)?shù)序列中,假定p、q是2個(gè)臨近的奇素?cái)?shù),pq,V(p)為奇素?cái)?shù)p在奇素?cái)?shù)序列中的位置號(hào)。除了2個(gè)變異奇數(shù)區(qū)間[115,125]和[1 329,1 359],在奇數(shù)區(qū)間[3,q~2)內(nèi),連續(xù)奇合數(shù)個(gè)數(shù)不大于V(p)。該定律強(qiáng)于Legendre猜想、Oppermann猜想、Andrica猜想和伯特蘭-切比雪夫定理。
[Abstract]:The prime number law can not be described accurately, but the prime number law can be described by threshold. In this paper, we introduce one of the most compact laws of prime distribution so far: in continuous odd prime sequences, it is assumed that p is two adjacent odd prime numbers and pq,V (p) is the position number of odd prime number p in odd prime number sequences. In addition to two odd variation intervals [115125] and [1329, 1359], in the odd number interval [3, Q 鈮，

本文編號(hào)：2518177