Algorithms for the split variational inequality problem Y Censor, A Gibali, S Reich Numerical Algorithms 59 (2), 301-323, 2012 | 381 | 2012 |

The subgradient extragradient method for solving variational inequalities in Hilbert space Y Censor, A Gibali, S Reich Journal of Optimization Theory and Applications 148 (2), 318-335, 2011 | 380 | 2011 |

The split common null point problem C Byrne, Y Censor, A Gibali, S Reich J. Nonlinear Convex Anal 13 (4), 759-775, 2012 | 237 | 2012 |

Strong convergence of subgradient extragradient methods for the variational inequality problem in Hilbert space Y Censor, A Gibali, S Reich Optimization Methods and Software 26 (4-5), 827-845, 2011 | 181 | 2011 |

Extensions of Korpelevich's extragradient method for the variational inequality problem in Euclidean space Y Censor, A Gibali, S Reich Optimization 61 (9), 1119-1132, 2012 | 172 | 2012 |

Common solutions to variational inequalities Y Censor, A Gibali, S Reich, S Sabach Set-Valued and Variational Analysis 20 (2), 229-247, 2012 | 81 | 2012 |

Modified subgradient extragradient method for variational inequality problems DV Thong, D Van Hieu Numerical Algorithms 79 (2), 597-610, 2018 | 69* | 2018 |

The split variational inequality problem Y Censor, A Gibali, S Reich The Technion-Israel Institue of Technology, Haifa September 20, 2010 | 42 | 2010 |

Outer approximation methods for solving variational inequalities in Hilbert space A Gibali, S Reich, R Zalas Optimization 66 (3), 417-437, 2017 | 34 | 2017 |

A von Neumann alternating method for finding common solutions to variational inequalities Y Censor, A Gibali, S Reich Nonlinear Analysis: Theory, Methods & Applications 75 (12), 4596-4603, 2012 | 32 | 2012 |

A new split inverse problem and application to least intensity feasible solutions A Gibali Pure Appl. Funct. Anal 2 (2), 243-258, 2017 | 28 | 2017 |

Note on the modified relaxation CQ algorithm for the split feasibility problem A Gibali, LW Liu, YC Tang Optimization Letters 12 (4), 817-830, 2018 | 26 | 2018 |

Iterative methods for solving variational inequalities in Euclidean space A Gibali, S Reich, R Zalas Journal of Fixed Point Theory and Applications 17 (4), 775-811, 2015 | 24 | 2015 |

A new non-Lipschitzian projection method for solving variational inequalities in Euclidean spaces A Gibali Journal of Nonlinear Analysis and Optimization: Theory & Applications 6 (1 …, 2015 | 24 | 2015 |

Projections onto super-half-spaces for monotone variational inequality problems in finite-dimensional space Y Censor, A Gibali Journal of nonlinear and convex analysis 9 (3), 461, 2008 | 23 | 2008 |

Tseng type methods for solving inclusion problems and its applications A Gibali, DV Thong Calcolo 55 (4), 1-22, 2018 | 21 | 2018 |

An algorithm for solving the variational inequality problem over the fixed point set of a quasi-nonexpansive operator in Euclidean space A Cegielski, A Gibali, S Reich, R Zalas Numerical Functional Analysis and Optimization 34 (10), 1067-1096, 2013 | 18 | 2013 |

A new double-projection method for solving variational inequalities in Banach spaces G Cai, A Gibali, OS Iyiola, Y Shehu Journal of Optimization Theory and Applications 178 (1), 219-239, 2018 | 16 | 2018 |

A new relaxed CQ algorithm for solving split feasibility problems in Hilbert spaces and its applications A Gibali, DT Mai Journal of Industrial & Management Optimization 15 (2), 963, 2019 | 14 | 2019 |

Convergence of projection and contraction algorithms with outer perturbations and their applications to sparse signals recovery QL Dong, A Gibali, D Jiang, SH Ke Journal of Fixed Point Theory and Applications 20 (1), 1-29, 2018 | 13 | 2018 |