作 者:
(肖欢);
机构地区:
南京大学数学系,江苏南京210093
出 处:
《南通大学学报(自然科学版)》
2017年第2期75-77,共3页
摘 要:
Legendre猜想是数论中一个与素数间隙有关的猜想,它断言对于每个正整数n,在2n和2(n+1)之间都有一个素数2.为此,文章首先研究了夹在2n和(n+1)之间的奇数,刻画了小于一个给定平方数的奇素数的特点.然后证明了如下的判定准则:若nΣr=3,r∈odd(「(n+1)2-r2/2r■ -「n2-r2/2r■)
Legendre's conjecture is a conjecture on prime gap in number theory. It states there is a prime between n^2 and (n + 1 )^2 for every positive integer n. In this paper a criterion for the conjecture was presented, to this end the odd primes less than a square was considered and a characterization of these odd primes was given and then a criterion for the Legendre's conjecture was also put forward: n∑r=3,r∈odd([(n+1)^2/2r]-[n^2-r^2/2r])〈n,Legendre's conjecture holds, otherwise if n∑r=3,r∈odd([(n+1)^2/2r]-[n^2-r^2/2r])≥n, then the Legendre's con-jecture fails.
关 键 词:
猜想
素数间隙
平方数
判定准则