| A new inexact alternating directions method for monotone variational inequalities B He, LZ Liao, D Han, H Yang Mathematical Programming 92 (1), 103-118, 2002 | 548 | 2002 |
| A note on the alternating direction method of multipliers D Han, X Yuan Journal of Optimization Theory and Applications 155 (1), 227-238, 2012 | 301 | 2012 |
| Linear rate convergence of the alternating direction method of multipliers for convex composite programming D Han, D Sun, L Zhang Mathematics of Operations Research 43 (2), 622-637, 2018 | 182 | 2018 |
| Competition and efficiency of private toll roads F Xiao, H Yang, D Han Transportation Research Part B: Methodological 41 (3), 292-308, 2007 | 159 | 2007 |
| Convergence of alternating direction method for minimizing sum of two nonconvex functions with linear constraints K Guo, DR Han, TT Wu International Journal of Computer Mathematics 94 (8), 1653-1669, 2017 | 143 | 2017 |
| Local linear convergence of the alternating direction method of multipliers for quadratic programs D Han, X Yuan SIAM Journal on numerical analysis 51 (6), 3446-3457, 2013 | 136 | 2013 |
| Solving non-additive traffic assignment problems: a descent method for co-coercive variational inequalities D Han, HK Lo European Journal of Operational Research 159 (3), 529-544, 2004 | 132 | 2004 |
| A survey on some recent developments of alternating direction method of multipliers DR Han Journal of the Operations Research Society of China 10 (1), 1-52, 2022 | 130 | 2022 |
| Conditions for strong ellipticity and M-eigenvalues L Qi, HH Dai, D Han Frontiers of Mathematics in China 4 (2), 349-364, 2009 | 112 | 2009 |
| The multi-class, multi-criterion traffic equilibrium and the efficiency of congestion pricing D Han, H Yang Transportation Research Part E: Logistics and Transportation Review 44 (5 …, 2008 | 112 | 2008 |
| Conditions for Strong Ellipticity of Anisotropic ElasticáMaterials D Han, HH Dai, L Qi Journal of Elasticity 97 (1), 1-13, 2009 | 109 | 2009 |
| On the convergence of the direct extension of ADMM for three-block separable convex minimization models with one strongly convex function X Cai, D Han, X Yuan Computational Optimization and Applications 66 (1), 39-73, 2017 | 103 | 2017 |
| A self-adaptive projection method for solving the multiple-sets split feasibility problem W Zhang, D Han, Z Li Inverse problems 25 (11), 115001, 2009 | 103 | 2009 |
| An augmented Lagrangian based parallel splitting method for separable convex minimization with applications to image processing D Han, X Yuan, W Zhang Mathematics of Computation 83 (289), 2263-2291, 2014 | 101 | 2014 |
| Linear convergence of the alternating direction method of multipliers for a class of convex optimization problems WH Yang, D Han SIAM journal on Numerical Analysis 54 (2), 625-640, 2016 | 100 | 2016 |
| Efficiency of the plate-number-based traffic rationing in general networks D Han, H Yang, X Wang Transportation Research Part E: Logistics and Transportation Review 46 (6 …, 2010 | 80 | 2010 |
| Two new self-adaptive projection methods for variational inequality problems D Han, HK Lo Computers & Mathematics with Applications 43 (12), 1529-1537, 2002 | 74 | 2002 |
| Modified Goldstein–Levitin–Polyak projection method for asymmetric strongly monotone variational inequalities BS He, H Yang, Q Meng, DR Han Journal of Optimization Theory and Applications 112 (1), 129-143, 2002 | 73 | 2002 |
| A new accuracy criterion for approximate proximal point algorithms D Han, B He Journal of Mathematical Analysis and Applications 263 (2), 343-354, 2001 | 71 | 2001 |
| Convergence of ADMM for multi-block nonconvex separable optimization models K Guo, D Han, DZW Wang, T Wu Frontiers of Mathematics in China 12 (5), 1139-1162, 2017 | 70 | 2017 |
