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

Abstract

For any m ≥ 1, let Hm denote the quantity Hm := n ∞ (pn+m-pn), where pn denotes the nth prime; thus for instance the twin prime conjecture is equivalent to the assertion that H1 is equal to two. In a recent breakthrough paper of Zhang, a finite upper bound was obtained for the first time on H1; more specifically, Zhang showed that H1 ≤ 70000000. Almost immediately after the appearance of Zhang's paper, improvements to the upper bound on H1 were made. In order to pool together these various efforts, a Polymath project was formed to collectively examine all aspects of Zhang's arguments, and to optimize the resulting bound on H1 as much as possible. After several months of intensive activity, conducted online in blogs and wiki pages, the upper bound was improved to H1 ≤ 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 H1 ≤ 600, and also showed for the first time that Hm was finite for all m. The polymath project, now with Maynard's assistance, then began work on improving these bounds, eventually obtaining the bound H1 ≤ 246, as well as a number of additional results, both conditional and unconditional, on Hm. 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.