English

Asymptotics for some polynomial patterns in the primes

Number Theory 2016-07-25 v2 Combinatorics

Abstract

We prove asymptotic formulae for sums of the form nZdKi=1tFi(ψi(n)), \sum_{n\in\mathbb{Z}^d\cap K}\prod_{i=1}^tF_i(\psi_i(n)), where KK is a convex body, each FiF_i is either the von Mangoldt function or the representation function of a quadratic form, and Ψ=(ψ1,,ψt)\Psi=(\psi_1,\ldots,\psi_t) is a system of linear forms of finite complexity. When all the functions FiF_i are equal to the von Mangoldt function, we recover a result of Green and Tao, while when they are all representation functions of quadratic forms, we recover a result of Matthiesen. Our formulae imply asymptotics for some polynomial patterns in the primes. Specifically, they describe the asymptotic behaviour of the number of kk-term arithmetic progressions of primes whose common difference is a sum of two squares. The article combines ingredients from the work of Green and Tao on linear equations in primes and that of Matthiesen on linear correlations amongst integers represented by a quadratic form. To make the von Mangoldt function compatible with the representation function of a quadratic form, we provide a new pseudorandom majorant for both -- an average of the known majorants for each of the functions -- and prove that it has the required pseudorandomness properties.

Keywords

Cite

@article{arxiv.1511.07317,
  title  = {Asymptotics for some polynomial patterns in the primes},
  author = {Pierre-Yves Bienvenu},
  journal= {arXiv preprint arXiv:1511.07317},
  year   = {2016}
}

Comments

45 pages; updated with the mentions of recent articles in the same area

R2 v1 2026-06-22T11:52:15.717Z