English

Polynomial patterns in the primes

Number Theory 2016-03-28 v1

Abstract

Let P1,,Pk ⁣:ZZP_1,\dots,P_k \colon {\bf Z} \to {\bf Z} be polynomials of degree at most dd for some d1d \geq 1, with the degree dd coefficients all distinct, and admissible in the sense that for every prime pp, there exists integers n,mn,m such that n+P1(m),,n+Pk(m)n+P_1(m),\dots,n+P_k(m) are all not divisible by pp. We show that there exist infinitely many natural numbers n,mn,m such that n+P1(m),,n+Pk(m)n+P_1(m),\dots,n+P_k(m) are simultaneously prime, generalizing a previous result of the authors, which was restricted to the special case P1(0)==Pk(0)=0P_1(0)=\dots=P_k(0)=0 (though it allowed for the top degree coefficients to coincide). Furthermore, we obtain an asymptotic for the number of such prime pairs n,mn,m with nNn \leq N and mMm \leq M with MM slightly less than N1/dN^{1/d}. Our arguments rely on four ingredients. The first is a (slightly modified) generalized von Neumann theorem of the authors, reducing matters to controlling certain averaged local Gowers norms of (suitable normalizations of) the von Mangoldt function. The second is a more recent concatenation theorem of the authors, controlling these averaged local Gowers norms by global Gowers norms. The third ingredient is the work of Green and the authors on linear equations in primes, allowing one to compute these global Gowers norms for the normalized von Mangoldt functions. Finally, we use the Conlon-Fox-Zhao densification approach to the transference principle to combine the preceding three ingredients together. In the special case P1(0)==Pk(0)=0P_1(0)=\dots=P_k(0)=0, our methods also give infinitely many n,mn,m with n+P1(m),,n+Pk(m)n+P_1(m),\dots,n+P_k(m) in a specified set primes of positive relative density δ\delta, with mm bounded by logLn\log^L n for some LL independent of the density δ\delta. This improves slightly on a result from our previous paper, in which LL was allowed to depend on δ\delta.

Keywords

Cite

@article{arxiv.1603.07817,
  title  = {Polynomial patterns in the primes},
  author = {Terence Tao and Tamar Ziegler},
  journal= {arXiv preprint arXiv:1603.07817},
  year   = {2016}
}

Comments

46 pages, no figures

R2 v1 2026-06-22T13:18:29.262Z