English

Patterns of primes in arithmetic progressions

Number Theory 2015-09-08 v2

Abstract

We show that there exists a bounded pattern of m consecutive primes for any m>0, that means a tuple H_m of m distinct non-negative integers h_i (i=1,2,...m) such that its translations contain arbitrarily long (finite) arithmetic progressions. More precisely, the set of natural numbers n for which all components n+h_i (i=1,2,...m) are consecutive primes contains arbitrarily long (finite) arithmetic progressions. Moreover, the set of m-tuples that satisfy this property represents a positive proportion of all m-tuples. The present result is the generalization of the results of Green-Tao (about the existence of arbitrarily long arithmetic progressions) and of Maynard/Tao (about the existence of infinitely many bounded blocks of m primes, where m is an arbitrary natural number). It also generalizes the author's work which first showed the existence of infinitely many Polignac numbers and they contain arbitrarily long (finite) arithmetic progressions (arXiv: 1305.6289v1, 27 May 2013) which was a common generalization of the above mentioned result of Green-Tao and that of Zhang (about the exisatence of infinitely many bounded gaps between primes).

Keywords

Cite

@article{arxiv.1509.01564,
  title  = {Patterns of primes in arithmetic progressions},
  author = {Janos Pintz},
  journal= {arXiv preprint arXiv:1509.01564},
  year   = {2015}
}

Comments

The new version proves also that we can additionally require that the primes in the relevant pattern should be consecutive

R2 v1 2026-06-22T10:49:33.058Z