| An unconditionally stable hybrid numerical method for solving the Allen–Cahn equation Y Li, HG Lee, D Jeong, J Kim Computers & Mathematics with Applications 60 (6), 1591-1606, 2010 | 162 | 2010 |
| Multiphase image segmentation using a phase-field model Y Li, J Kim Computers & Mathematics with Applications 62 (2), 737-745, 2011 | 107 | 2011 |
| A phase-field fluid modeling and computation with interfacial profile correction term Y Li, JI Choi, J Kim Communications in Nonlinear Science and Numerical Simulation 30 (1-3), 84-100, 2016 | 76 | 2016 |
| A fast, robust, and accurate operator splitting method for phase-field simulations of crystal growth Y Li, HG Lee, J Kim Journal of Crystal Growth 321 (1), 176-182, 2011 | 74 | 2011 |
| Fast local image inpainting based on the Allen–Cahn model Y Li, D Jeong, J Choi, S Lee, J Kim Digital Signal Processing 37, 65-74, 2015 | 70 | 2015 |
| An efficient and stable compact fourth-order finite difference scheme for the phase field crystal equation Y Li, J Kim Computer Methods in Applied Mechanics and Engineering 319, 194-216, 2017 | 68 | 2017 |
| Multi-component Cahn–Hilliard system with different boundary conditions in complex domains Y Li, JI Choi, J Kim Journal of Computational Physics 323, 1-16, 2016 | 63 | 2016 |
| A conservative numerical method for the Cahn–Hilliard equation with Dirichlet boundary conditions in complex domains Y Li, D Jeong, J Shin, J Kim Computers & Mathematics with Applications 65 (1), 102-115, 2013 | 63 | 2013 |
| A compact fourth-order finite difference scheme for the three-dimensional Cahn–Hilliard equation Y Li, HG Lee, B Xia, J Kim Computer Physics Communications 200, 108-116, 2016 | 60 | 2016 |
| Efficient numerical schemes with unconditional energy stabilities for the modified phase field crystal equation Q Li, L Mei, X Yang, Y Li Advances in Computational Mathematics 45, 1551-1580, 2019 | 56 | 2019 |
| An unconditionally energy-stable second-order time-accurate scheme for the Cahn–Hilliard equation on surfaces Y Li, J Kim, N Wang Communications in Nonlinear Science and Numerical Simulation 53, 213-227, 2017 | 56 | 2017 |
| Computationally efficient adaptive time step method for the Cahn–Hilliard equation Y Li, Y Choi, J Kim Computers & Mathematics with Applications 73 (8), 1855-1864, 2017 | 51 | 2017 |
| A new phase-field model for a water–oil-surfactant system A Yun, Y Li, J Kim Applied Mathematics and Computation 229, 422-432, 2014 | 50 | 2014 |
| Phase-field simulations of crystal growth with adaptive mesh refinement Y Li, J Kim International journal of heat and mass transfer 55 (25-26), 7926-7932, 2012 | 45 | 2012 |
| Three-dimensional volume reconstruction from slice data using phase-field models Y Li, J Shin, Y Choi, J Kim Computer Vision and Image Understanding 137, 115-124, 2015 | 42 | 2015 |
| A second-order accurate, unconditionally energy stable numerical scheme for binary fluid flows on arbitrarily curved surfaces Q Xia, Q Yu, Y Li Computer Methods in Applied Mechanics and Engineering 384, 113987, 2021 | 41 | 2021 |
| Simple and efficient volume merging method for triply periodic minimal structures Y Li, Q Xia, S Yoon, C Lee, B Lu, J Kim Computer Physics Communications 264, 107956, 2021 | 41 | 2021 |
| An unconditionally stable hybrid method for image segmentation Y Li, J Kim Applied Numerical Mathematics 82, 32-43, 2014 | 40 | 2014 |
| A robust and efficient fingerprint image restoration method based on a phase-field model Y Li, Q Xia, C Lee, S Kim, J Kim Pattern Recognition 123, 108405, 2022 | 38 | 2022 |
| An unconditionally stable numerical method for bimodal image segmentation Y Li, J Kim Applied Mathematics and Computation 219 (6), 3083-3090, 2012 | 36 | 2012 |
Darae JeongKangwon National UniversityAdresse e-mail validée de korea.ac.kr