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 | 36 | 2021 |
A fourth-order spatial accurate and practically stable compact scheme for the Cahn–Hilliard equation C Lee, D Jeong, J Shin, Y Li, J Kim Physica A: Statistical Mechanics and its Applications 409, 17-28, 2014 | 31 | 2014 |
The susceptible-unidentified infected-confirmed (SUC) epidemic model for estimating unidentified infected population for COVID-19 C Lee, Y Li, J Kim Chaos, Solitons & Fractals 139, 110090, 2020 | 29 | 2020 |
Fourier-spectral method for the phase-field equations S Yoon, D Jeong, C Lee, H Kim, S Kim, HG Lee, J Kim Mathematics 8 (8), 1385, 2020 | 27 | 2020 |
Comparison of different numerical schemes for the Cahn-Hilliard equation S Lee, C Lee, HG Lee, J Kim Journal of the Korean Society for Industrial and Applied Mathematics 17 (3 …, 2013 | 27 | 2013 |
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 | 26 | 2022 |
Surface embedding narrow volume reconstruction from unorganized points Y Li, D Lee, C Lee, J Lee, S Lee, J Kim, S Ahn, J Kim Computer Vision and Image Understanding 121, 100-107, 2014 | 24 | 2014 |
Pattern formation in reaction–diffusion systems on evolving surfaces H Kim, A Yun, S Yoon, C Lee, J Park, J Kim Computers & Mathematics with Applications 80 (9), 2019-2028, 2020 | 18 | 2020 |
Fast and accurate smoothing method using a modified Allen–Cahn equation J Wang, Y Li, Y Choi, C Lee, J Kim Computer-Aided Design 120, 102804, 2020 | 18 | 2020 |
Mathematical model and numerical simulation for tissue growth on bioscaffolds HG Lee, J Park, S Yoon, C Lee, J Kim Applied Sciences 9 (19), 4058, 2019 | 16 | 2019 |
Controlling COVID-19 outbreaks with financial incentives C Lee, S Kwak, J Kim International journal of environmental research and public health 18 (2), 724, 2021 | 15 | 2021 |
Comparison study on the different dynamics between the Allen–Cahn and the Cahn–Hilliard equations Y Li, D Jeong, H Kim, C Lee, J Kim Computers & Mathematics with Applications 77 (2), 311-322, 2019 | 15 | 2019 |
A conservative numerical method for the Cahn-Hilliard equation with generalized mobilities on curved surfaces in three-dimensional space D Jeong, Y Li, C Lee, J Yang, J Kim Communications in Computational Physics 27 (2), 412-430, 2020 | 14 | 2020 |
An unconditionally stable scheme for the Allen–Cahn equation with high-order polynomial free energy C Lee, H Kim, S Yoon, S Kim, D Lee, J Park, S Kwak, J Yang, J Wang, ... Communications in Nonlinear Science and Numerical Simulation 95, 105658, 2021 | 13 | 2021 |
Shape transformation using the modified Allen–Cahn equation H Kim, S Yoon, J Wang, C Lee, S Kim, J Park, J Kim Applied Mathematics Letters 107, 106487, 2020 | 13 | 2020 |
An explicit conservative Saul’yev scheme for the Cahn–Hilliard equation J Yang, Y Li, C Lee, HG Lee, S Kwak, Y Hwang, X Xin, J Kim International Journal of Mechanical Sciences 217, 106985, 2022 | 12 | 2022 |
A conservative and stable explicit finite difference scheme for the diffusion equation J Yang, C Lee, S Kwak, Y Choi, J Kim Journal of Computational Science 56, 101491, 2021 | 12 | 2021 |
Finite difference method for the multi-asset Black–Scholes equations S Kim, D Jeong, C Lee, J Kim Mathematics 8 (3), 391, 2020 | 11 | 2020 |
Phase-field computations of anisotropic ice crystal growth on a spherical surface C Lee, S Yoon, J Park, H Kim, Y Li, D Jeong, S Kim, S Kwak, J Kim Computers & Mathematics with Applications 125, 25-33, 2022 | 9 | 2022 |
Phase-field modeling and computer simulation of the coffee-ring effect J Yang, H Kim, C Lee, S Kim, J Wang, S Yoon, J Park, J Kim Theoretical and Computational Fluid Dynamics 34, 679-692, 2020 | 9 | 2020 |