English

Short effective intervals containing primes in arithmetic progressions and the seven cubes problem

Number Theory 2020-12-09 v1

Abstract

Let q3q\ge 3 be a non-exceptional modulus q3q\ge3, and let aa be a positive integer coprime with qq. For any ϵ>0\epsilon>0, there exists α>0\alpha>0 (computable), such that for all xα(logq)2x\ge \alpha (\log q)^2, the interval [ex,ex+ϵ]\left[ e^x,e^{x+\epsilon }\right] contains a prime pp in the arithmetic progression amodqa \bmod q. This gives the bound for the least prime in this arithmetic progression: P(a,q)eα(logq)2P(a,q) \le e^{\alpha (\log q)^2}. For instance for all q1030q\ge 10^{30}, P(a,q)e4.401(logq)2P(a,q) \le e^{4.401(\log q)^2}. Finally, we apply this result to establish that every integer larger than e71000e^{71\,000} is a sum of seven cubes.

Keywords

Cite

@article{arxiv.2012.01413,
  title  = {Short effective intervals containing primes in arithmetic progressions and the seven cubes problem},
  author = {Habiba Kadiri},
  journal= {arXiv preprint arXiv:2012.01413},
  year   = {2020}
}
R2 v1 2026-06-23T20:40:54.040Z