Variants of the Selberg sieve, and bounded intervals containing many primes DHJ Polymath Research in the Mathematical sciences 1, 1-83, 2014 | 224 | 2014 |

A new proof of the density Hales-Jewett theorem DHJ Polymath Annals of Mathematics, 1283-1327, 2012 | 171 | 2012 |

The" bounded gaps between primes" Polymath project-a retrospective DHJ Polymath arXiv preprint arXiv:1409.8361, 2014 | 61* | 2014 |

Density hales-jewett and moser numbers DHJ Polymath An Irregular Mind: Szemerédi is 70, 689-753, 2010 | 28 | 2010 |

The probability that a random triple of dice is transitive DHJ Polymath arXiv preprint arXiv:2211.16156, 2022 | 18 | 2022 |

Effective approximation of heat flow evolution of the Riemann function, and a new upper bound for the de Bruijn–Newman constant DHJ Polymath Research in the Mathematical Sciences 6, 1-67, 2019 | 17 | 2019 |

Deterministic methods to find primes DHJ Polymath Math. Comp. 81, 1233-1246, 2010 | 9 | 2010 |

Variants of the Selberg sieve and bounded intervals containing many primes. Research in the Mathematical Sciences. 1 (12) DHJ Polymath arXiv preprint arxiv:1407.4897, 2014 | 7 | 2014 |

A new bound for gaps between primes DHJ Polymath Preprint, 2013 | 7 | 2013 |

New equidistribution estimates of Zhang type, Algebra Number Theory 8 (2014), no. 9, 2067–2199 DHJ Polymath MR0422179 https://doi. org/10.3792/pja/1195518296, 0 | 5 | |

Bounded gaps between primes, Polymath 8 Project DHJ Polymath | 3 | |

Density Hales–Jewett and Moser numbers in low dimensions DHJ Polymath Unpublished, http://michaelnielsen. org/polymath1, 2009 | 1 | 2009 |

Algebra & Number Theory A Chatzistamatiou, K Rülling ALGEBRA AND NUMBER THEORY 5 (6), 2011 | | 2011 |