The principal purpose of this paper is to consider the bounds of solutions of the cubic equationwith the prime variables in arithmetic progressions modulo k > 1.
本文的主要目的是估计三次素变数方程的解在模k≥1算术数列中的上界。
参考来源 - 三次素变数方程在算术数列中解的上界估计·2,447,543篇论文数据,部分数据来源于NoteExpress
以上来源于: WordNet
It has been proved that the primes contain arbitrarily long arithmetic progressions.
已有结论表明:素数集中存在任意长的算术级数。
Arithmetic progressions, any one in which consists of 3 primes and 1 almost prime, are investigated.
考察了由3个素数和1个殆素数构成的等差数列。
Every large odd integer can be represeted as the sum of three primes which take from arithmetic progressions.
解决了三素数定理推广到素数取自算术级数的问题。
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