Path-following methods for linear programming CC Gonzaga SIAM review 34 (2), 167-224, 1992 | 543 | 1992 |

An Algorithm for Solving Linear Programming Problems in *O*(*n* ^{3} *L*) OperationsCC Gonzaga Progress in mathematical programming, 1-28, 1989 | 321 | 1989 |

A globally convergent filter method for nonlinear programming CC Gonzaga, E Karas, M Vanti SIAM Journal on Optimization 14 (3), 646-669, 2004 | 143 | 2004 |

An improved algorithm for optimization problems with functional inequality constraints C Gonzaga, E Polak, R Trahan IEEE Transactions on Automatic Control 25 (1), 49-54, 1980 | 117 | 1980 |

Polynomial affine algorithms for linear programming CC Gonzaga Mathematical Programming 49 (1-3), 7-21, 1990 | 115 | 1990 |

Conical projection algorithms for linear programming CC Gonzaga Mathematical Programming 43 (1-3), 151-173, 1989 | 105 | 1989 |

Large step path-following methods for linear programming, part I: barrier function method CC Gonzaga SIAM Journal on Optimization 1 (2), 268-279, 1991 | 103 | 1991 |

On constraint dropping schemes and optimality functions for a class of outer approximations algorithms C Gonzaga, E Polak SIAM Journal on Control and Optimization 17 (4), 477-493, 1979 | 91 | 1979 |

Convergence of interior point algorithms for the monotone linear complementarity problem JF Bonnans, CC Gonzaga Mathematics of Operations Research 21 (1), 1-25, 1996 | 89 | 1996 |

An -Iteration Large-Step Primal-Dual Affine Algorithm for Linear Programming CC Gonzaga, MJ Todd SIAM Journal on Optimization 2 (3), 349-359, 1992 | 66 | 1992 |

Global convergence of filter methods for nonlinear programming AA Ribeiro, EW Karas, CC Gonzaga SIAM Journal on Optimization 19 (3), 1231-1249, 2008 | 56 | 2008 |

The largest step path following algorithm for monotone linear complementarity problems CC Gonzaga Mathematical Programming 76 (2), 309-332, 1997 | 54 | 1997 |

Convergence of the large step primal affine-scaling algorithm for primal nondegenerate linear programs CC Gonzaga Department of Systems Engineering and Computer Sciences, COPPE-Federal …, 1990 | 53 | 1990 |

On the Convergence of the Mizuno--Todd--Ye Algorithm to the Analytic Center of the Solution Set CC Gonzaga, RA Tapia SIAM Journal on Optimization 7 (1), 47-65, 1997 | 52 | 1997 |

A nonlinear programming algorithm based on non-coercive penalty functions CC Gonzaga, RA Castillo Mathematical Programming 96 (1), 87-101, 2003 | 50 | 2003 |

Large step path-following methods for linear programming, part II: Potential reduction method CC Gonzaga SIAM Journal on Optimization 1 (2), 280-292, 1991 | 50 | 1991 |

A note on properties of condition numbers CC Gonzaga, HJ Lara Linear Algebra and its Applications 261 (1-3), 269-273, 1997 | 35 | 1997 |

Fine tuning Nesterov’s steepest descent algorithm for differentiable convex programming CC Gonzaga, EW Karas Mathematical Programming 138 (1-2), 141-166, 2013 | 34 | 2013 |

Search directions for interior linear-programming methods CC Gonzaga Algorithmica 6 (1-6), 153-181, 1991 | 34 | 1991 |

Examples of ill-behaved central paths in convex optimization JC Gilbert, CC Gonzaga, E Karas Mathematical programming 103 (1), 63-94, 2005 | 28 | 2005 |