English

The "bounded gaps between primes" Polymath project - a retrospective

History and Overview 2014-10-01 v1

Abstract

For any m1m \geq 1, let HmH_m denote the quantity Hm:=lim infn(pn+mpn)H_m := \liminf_{n \to \infty} (p_{n+m}-p_n), where pnp_n denotes the nthn^{\operatorname{th}} prime; thus for instance the twin prime conjecture is equivalent to the assertion that H1H_1 is equal to two. In a recent breakthrough paper of Zhang, a finite upper bound was obtained for the first time on H1H_1; more specifically, Zhang showed that H170000000H_1 \leq 70000000. Almost immediately after the appearance of Zhang's paper, improvements to the upper bound on H1H_1 were made. In order to pool together these various efforts, a \emph{Polymath project} was formed to collectively examine all aspects of Zhang's arguments, and to optimize the resulting bound on H1H_1 as much as possible. After several months of intensive activity, conducted online in blogs and wiki pages, the upper bound was improved to H14680H_1 \leq 4680. As these results were being written up, a further breakthrough was introduced by Maynard, who found a simpler sieve-theoretic argument that gave the improved bound H1600H_1 \leq 600, and also showed for the first time that HmH_m was finite for all mm. The polymath project, now with Maynard's assistance, then began work on improving these bounds, eventually obtaining the bound H1246H_1 \leq 246, as well as a number of additional results, both conditional and unconditional, on HmH_m. In this article, we collect the perspectives of several of the participants to these Polymath projects, in order to form a case study of online collaborative mathematical activity, and to speculate on the suitability of such an online model for other mathematical research projects.

Keywords

Cite

@article{arxiv.1409.8361,
  title  = {The "bounded gaps between primes" Polymath project - a retrospective},
  author = {D. H. J. Polymath},
  journal= {arXiv preprint arXiv:1409.8361},
  year   = {2014}
}

Comments

19 pages, submitted, Newsletter of the EMS

R2 v1 2026-06-22T06:08:58.263Z