Improving the efficiency and reliability of digital time-stamping D Bayer, S Haber, WS Stornetta Sequences Ii, 329-334, 1993 | 600 | 1993 |

Trailing the dovetail shuffle to its lair D Bayer, P Diaconis Annals of applied probability 2 (2), 294-313, 1992 | 457 | 1992 |

The nonlinear geometry of linear programming. I. Affine and projective scaling trajectories DA Bayer, JC Lagarias Transactions of the American Mathematical Society 314 (2), 499-526, 1989 | 365 | 1989 |

What can be computed in algebraic geometry? D Bayer, D Mumford arXiv preprint alg-geom/9304003, 1993 | 354 | 1993 |

Cellular resolutions of monomial modules D Bayer, B Sturmfels arXiv preprint alg-geom/9711023, 1997 | 241 | 1997 |

Monomial resolutions D Bayer, I Peeva, B Sturmfels arXiv preprint alg-geom/9610012, 1996 | 239 | 1996 |

Macaulay: A system for computation in algebraic geometry and commutative algebra D Bayer, M Stillman Source and object code available for Unix and Macintosh computers. Contact …, 1982 | 137 | 1982 |

The nonlinear geometry of linear programming. II. Legendre transform coordinates and central trajectories DA Bayer, JC Lagarias Transactions of the American Mathematical Society 314 (2), 527-581, 1989 | 133 | 1989 |

Computation of Hilbert functions D Bayer, M Stillman Journal of Symbolic Computation 14 (1), 31-50, 1992 | 130 | 1992 |

Extremal Betti numbers and applications to monomial ideals D Bayer, H Charalambous, S Popescu arXiv preprint math/9804052, 1998 | 116 | 1998 |

Ribbons and their canonical embeddings D Bayer, D Eisenbud Transactions of the American Mathematical Society 347 (3), 719-756, 1995 | 101 | 1995 |

Graph curves D Bayer, D Eisenbud Advances in mathematics 86 (1), 1-40, 1991 | 55 | 1991 |

Karmarkar's linear programming algorithm and Newton's method DA Bayer, JC Lagarias Mathematical Programming 50 (1), 291-330, 1991 | 46 | 1991 |

Syzygies of unimodular Lawrence ideals D Bayer, S Popescu, B Sturmfels arXiv preprint math/9912247, 1999 | 40 | 1999 |

Macaulay D Bayer, M Stillman A computer algebra system for algebraic geometry, 1990 | 38 | 1990 |

Grobner bases and extension of scalars D Bayer, A Galligo, M Stillman arXiv preprint alg-geom/9202021, 1992 | 37 | 1992 |

What can be computed in algebraic geometry? Computational algebraic geometry and commutative algebra (Cortona, 1991), 1–48 D Bayer, D Mumford Sympos. Math., XXXIV, Cambridge Univ. Press, Cambridge, 1993 | 36 | 1993 |

Macaulay user manual M Stillman, M Stillman, D Bayer Available by anonymous ftp from various sites, 1989 | 28 | 1989 |

Monomial ideals and duality D Bayer unpublished lecture notes, 1996 | 27 | 1996 |

Certification of witness: mitigating blockchain fork attacks BL Shultz, D Bayer Undergraduate Thesis in Mathematics, Columbia University in the City of New York, 2015 | 10 | 2015 |