An implementable proximal point algorithmic framework for nuclear norm minimization YJ Liu, D Sun, KC Toh Mathematical programming 133, 399-436, 2012 | 147 | 2012 |

Deterministic global optimization approach to steady-state distribution gas pipeline networks Y Wu, KK Lai, Y Liu Optimization and Engineering 8, 259-275, 2007 | 61 | 2007 |

Some properties of a class of merit functions for symmetric cone complementarity problems YJ Liu, LW Zhang, YH Wang Asia-Pacific Journal of Operational Research 23 (04), 473-495, 2006 | 47 | 2006 |

Convergence of the augmented Lagrangian method for nonlinear optimization problems over second-order cones YJ Liu, LW Zhang Journal of optimization theory and applications 139 (3), 557-575, 2008 | 39 | 2008 |

Convergence analysis of the augmented Lagrangian method for nonlinear second-order cone optimization problems YJ Liu, LW Zhang Nonlinear Analysis: Theory, Methods & Applications 67 (5), 1359-1373, 2007 | 39 | 2007 |

Efficient sparse semismooth Newton methods for the clustered Lasso problem M Lin, YJ Liu, D Sun, KC Toh SIAM Journal on Optimization 29 (3), 2026-2052, 2019 | 35 | 2019 |

Analysis of a smoothing method for symmetric conic linear programming YJ Liu, LW Zhang, YH Wang Journal of Applied Mathematics and Computing 22, 133-148, 2006 | 26 | 2006 |

A semismooth Newton-CG based dual PPA for matrix spectral norm approximation problems C Chen, YJ Liu, D Sun, KC Toh Mathematical Programming 155 (1), 435-470, 2016 | 21 | 2016 |

Extension of smoothing functions to symmetric cone complementarity problems Y Liu, L Zhang, M Liu Applied Mathematics-A Journal of Chinese Universities 22 (2), 245-252, 2007 | 21 | 2007 |

Finding the projection onto the intersection of a closed half-space and a variable box YJ Liu, S Wang, J Sun Operations Research Letters 41 (3), 259-264, 2013 | 10 | 2013 |

Variational geometry of the complementarity set for second order cone Y Jiang, YJ Liu, LW Zhang Set-Valued and Variational Analysis 23 (3), 399-414, 2015 | 7 | 2015 |

Convergence analysis of a nonlinear Lagrangian algorithm for nonlinear programming with inequality constraints LW Zhang, YJ Liu Journal of Applied Mathematics and Computing 13 (1), 1-10, 2003 | 7 | 2003 |

Fast algorithm for singly linearly constrained quadratic programs with box-like constraints M Liu, YJ Liu Computational Optimization and Applications 66, 309-326, 2017 | 6 | 2017 |

Convergence properties of a smoothing method for linear second-order cone programming YJ Liu, LW Zhang, YH Wang Advances in Mathematics 36 (4), 491-502, 2007 | 6 | 2007 |

An Inexact SQP Newton Method for Convex SC^{1} Minimization ProblemsYD Chen, Y Gao, YJ Liu Journal of optimization theory and applications 146, 33-49, 2010 | 5 | 2010 |

A majorized penalty approach penalty to inverse linear second order cone programming problems SY Wang, YJ Liu, Y Jiang Journal of Industrial and Management Optimization 10 (3), 965–976, 2014 | 3 | 2014 |

On the approximate augmented Lagrangian for nonlinear symmetric cone programming YJ Liu, LW Zhang Nonlinear Analysis: Theory, Methods & Applications 68 (5), 1210-1225, 2008 | 3 | 2008 |

Convergence Analysis of a Nonlinear Lagrange Algorithm for Noneonvex Semidefinite Programming LYJZLWL MJ OR Transactions 11 (4), 5-14, 2007 | 2 | 2007 |

On the characterizations of solutions to perturbed *l*_{1} conic optimization problemYJ Liu, R Li, B Wang Optimization 68 (6), 1157-1186, 2019 | 1 | 2019 |

DIFFERENTIAL PROPERTIES OF THE METRIC PROJECTORS OVER THE EPIGRAPH OF THE WEIGHTED l (1) AND l (infinity) NORMS YJ Liu, N Han, S Wang, C Chen PACIFIC JOURNAL OF OPTIMIZATION 11 (4), 737-749, 2015 | 1 | 2015 |