| Inertial projection and contraction algorithms for variational inequalities QL Dong, YJ Cho, LL Zhong, TM Rassias Journal of Global Optimization 70, 687-704, 2018 | 242 | 2018 |
| Modified inertial Mann algorithm and inertial CQ-algorithm for nonexpansive mappings QL Dong, HB Yuan, YJ Cho, TM Rassias Optimization Letters 12, 87-102, 2018 | 161 | 2018 |
| The extragradient algorithm with inertial effects for solving the variational inequality QL Dong, YY Lu, J Yang Optimization 65 (12), 2217-2226, 2016 | 154 | 2016 |
| Single projection method for pseudo-monotone variational inequality in Hilbert spaces Y Shehu, QL Dong, D Jiang Optimization 68 (1), 385-409, 2019 | 131 | 2019 |
| A strong convergence result involving an inertial forward–backward algorithm for monotone inclusions Q Dong, D Jiang, P Cholamjiak, Y Shehu Journal of Fixed Point Theory and Applications 19, 3097-3118, 2017 | 86 | 2017 |
| Solving the split equality problem without prior knowledge of operator norms QL Dong, S He, J Zhao Optimization 64 (9), 1887-1906, 2015 | 74 | 2015 |
| A modified subgradient extragradient method for solving the variational inequality problem QL Dong, D Jiang, A Gibali Numerical Algorithms 79, 927-940, 2018 | 67 | 2018 |
| MiKM: multi-step inertial Krasnosel’skiǐ–Mann algorithm and its applications QL Dong, JZ Huang, XH Li, YJ Cho, TM Rassias Journal of Global Optimization 73, 801-824, 2019 | 57 | 2019 |
| “Optimal” choice of the step length of the projection and contraction methods for solving the split feasibility problem QL Dong, YC Tang, YJ Cho, TM Rassias Journal of Global Optimization 71, 341-360, 2018 | 51 | 2018 |
| An efficient projection-type method for monotone variational inequalities in Hilbert spaces Y Shehu, XH Li, QL Dong Numerical Algorithms 84, 365-388, 2020 | 47 | 2020 |
| A method with inertial extrapolation step for split monotone inclusion problems Y Yao, Y Shehu, XH Li, QL Dong Optimization 70 (4), 741-761, 2021 | 45 | 2021 |
| Alternated inertial projection methods for the split equality problem QL Dong, Y Peng, Y Yao Journal of Nonlinear and Convex Analysis 22 (1), 53-67, 2021 | 45 | 2021 |
| Multiscale asymptotic expansions and numerical algorithms for the wave equations of second order with rapidly oscillating coefficients QL Dong, LQ Cao Applied numerical mathematics 59 (12), 3008-3032, 2009 | 42 | 2009 |
| New algorithms and convergence theorems for solving variational inequalities with non-Lipschitz mappings S Reich, DV Thong, QL Dong, XH Li, VT Dung Numerical Algorithms 87, 527-549, 2021 | 41 | 2021 |
| Inertial relaxed CQ algorithms for solving a split feasibility problem in Hilbert spaces DR Sahu, YJ Cho, QL Dong, MR Kashyap, XH Li Numerical Algorithms 87, 1075-1095, 2021 | 40 | 2021 |
| A new hybrid algorithm and its numerical realization for two nonexpansive mappings QL Dong, S He, YJ Cho Fixed Point Theory and Applications 2015, 1-12, 2015 | 39 | 2015 |
| General inertial Mann algorithms and their convergence analysis for nonexpansive mappings QL Dong, YJ Cho, TM Rassias Applications of Nonlinear Analysis, 175-191, 2018 | 35 | 2018 |
| The projection and contraction methods for finding common solutions to variational inequality problems QL Dong, YJ Cho, TM Rassias Optimization Letters 12, 1871-1896, 2018 | 33 | 2018 |
| Accelerated Mann and CQ algorithms for finding a fixed point of a nonexpansive mapping QL Dong, H Yuan Fixed Point Theory and Applications 2015, 1-12, 2015 | 33 | 2015 |
| Self-adaptive projection and contraction methods with alternated inertial terms for solving the split feasibility problem QL Dong, L Liu, Y Yao Journal of Nonlinear and Convex Analysis 23 (3), 591-605, 2022 | 32 | 2022 |
Yeol-Je ChoProfessor and Ph. D., Department of Mathematics Education, Gyeongsang National University在 gnu.ac.kr 的电子邮件经过验证
