| An unconstrained smooth minimization reformulation of the second-order cone complementarity problem JS Chen, P Tseng Mathematical Programming 104, 293-327, 2005 | 207 | 2005 |
| Analysis of nonsmooth vector-valued functions associated with second-order cones JS Chen, X Chen, P Tseng Mathematical Programming 101, 95-117, 2004 | 146 | 2004 |
| A family of NCP functions and a descent method for the nonlinear complementarity problem JS Chen, S Pan Computational Optimization and Applications 40, 389-404, 2008 | 124 | 2008 |
| A damped Gauss-Newton method for the second-order cone complementarity problem S Pan, JS Chen Applied Mathematics and Optimization 59 (3), 293-318, 2009 | 69 | 2009 |
| Two classes of merit functions for the second-order cone complementarity problem JS Chen Mathematical Methods of Operations Research 64 (3), 495-519, 2006 | 68 | 2006 |
| On some NCP-functions based on the generalized Fischer–Burmeister function JS Chen Asia-Pacific Journal of Operational Research 24 (03), 401-420, 2007 | 65 | 2007 |
| The semismooth-related properties of a merit function and a descent method for the nonlinear complementarity problem JS Chen Journal of Global Optimization 36, 565-580, 2006 | 65 | 2006 |
| A survey on SOC complementarity functions and solution methods for SOCPs and SOCCPs JS Chen, SH Pan Pacific Journal of Optimization 8 (1), 33-74, 2012 | 62 | 2012 |
| The convex and monotone functions associated with second-order cone JS Chen Optimization 55 (4), 363-385, 2006 | 60 | 2006 |
| Properties of circular cone and spectral factorization associated with circular cone JC Zhou, JS Chen J. Nonlinear Convex Anal 14 (4), 807-816, 2013 | 59 | 2013 |
| Neural networks for solving second-order cone constrained variational inequality problem J Sun, JS Chen, CH Ko Computational optimization and applications 51, 623-648, 2012 | 56 | 2012 |
| A semismooth Newton method for SOCCPs based on a one-parametric class of SOC complementarity functions S Pan, JS Chen Computational optimization and applications 45 (1), 59-88, 2010 | 54 | 2010 |
| A neural network based on the generalized Fischer–Burmeister function for nonlinear complementarity problems JS Chen, CH Ko, S Pan Information Sciences 180 (5), 697-711, 2010 | 53 | 2010 |
| Numerical comparisons based on four smoothing functions for absolute value equation B Saheya, CH Yu, JS Chen Journal of Applied Mathematics and Computing 56, 131-149, 2018 | 47 | 2018 |
| A one-parametric class of merit functions for the symmetric cone complementarity problem S Pan, JS Chen Journal of Mathematical Analysis and Applications 355 (1), 195-215, 2009 | 45 | 2009 |
| Properties of a family of generalized NCP-functions and a derivative free algorithm for complementarity problems SL Hu, ZH Huang, JS Chen Journal of computational and applied mathematics 230 (1), 69-82, 2009 | 43 | 2009 |
| Recurrent neural networks for solving second-order cone programs CH Ko, JS Chen, CY Yang Neurocomputing 74 (17), 3646-3653, 2011 | 36 | 2011 |
| A one-parametric class of merit functions for the second-order cone complementarity problem JS Chen, S Pan Computational Optimization and Applications 45, 581-606, 2010 | 34 | 2010 |
| Unified smoothing functions for absolute value equation associated with second-order cone CT Nguyen, B Saheya, YL Chang, JS Chen Applied Numerical Mathematics 135, 206-227, 2019 | 33 | 2019 |
| A new merit function and its related properties for the second-order cone complementarity problem JS Chen Pacific Journal of Optimization 2 (1), 167-179, 2006 | 32 | 2006 |
Xin ChenUniversity of Illinois at Urbana-Champaign在 illinois.edu 的电子邮件经过验证
