Physical, mathematical, and numerical derivations of the Cahn–Hilliard equation D Lee, JY Huh, D Jeong, J Shin, A Yun, J Kim Computational Materials Science 81, 216-225, 2014 | 183 | 2014 |
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 | 152 | 2010 |
An unconditionally gradient stable numerical method for solving the Allen–Cahn equation JW Choi, HG Lee, D Jeong, J Kim Physica A: Statistical Mechanics and its Applications 388 (9), 1791-1803, 2009 | 150 | 2009 |
Basic principles and practical applications of the Cahn–Hilliard equation J Kim, S Lee, Y Choi, SM Lee, D Jeong Mathematical Problems in Engineering 2016, 2016 | 83 | 2016 |
Conservative Allen–Cahn–Navier–Stokes system for incompressible two-phase fluid flows D Jeong, J Kim Computers & Fluids 156, 239-246, 2017 | 82 | 2017 |
Finite element analysis of Schwarz P surface pore geometries for tissue-engineered scaffolds J Shin, S Kim, D Jeong, HG Lee, D Lee, JY Lim, J Kim Mathematical Problems in Engineering 2012, 2012 | 67 | 2012 |
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 | 64 | 2015 |
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 | 59 | 2013 |
An explicit hybrid finite difference scheme for the Allen–Cahn equation D Jeong, J Kim Journal of Computational and Applied Mathematics 340, 247-255, 2018 | 46 | 2018 |
A comparison study of ADI and operator splitting methods on option pricing models D Jeong, J Kim Journal of Computational and Applied Mathematics 247, 162-171, 2013 | 43 | 2013 |
A conservative numerical method for the Cahn–Hilliard equation in complex domains J Shin, D Jeong, J Kim Journal of Computational Physics 230 (19), 7441-7455, 2011 | 41 | 2011 |
A finite difference method for a conservative Allen–Cahn equation on non-flat surfaces J Kim, D Jeong, SD Yang, Y Choi Journal of Computational Physics 334, 170-181, 2017 | 37 | 2017 |
An accurate and efficient numerical method for Black-Scholes equations DR Jeong, JS Kim, IS Wee Communications of the Korean Mathematical Society 24 (4), 617-628, 2009 | 33 | 2009 |
Motion by mean curvature of curves on surfaces using the Allen–Cahn equation Y Choi, D Jeong, S Lee, M Yoo, J Kim International Journal of Engineering Science 97, 126-132, 2015 | 32 | 2015 |
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 |
Comparison study of numerical methods for solving the Allen–Cahn equation D Jeong, S Lee, D Lee, J Shin, J Kim Computational Materials Science 111, 131-136, 2016 | 30 | 2016 |
Numerical analysis of energy-minimizing wavelengths of equilibrium states for diblock copolymers D Jeong, J Shin, Y Li, Y Choi, JH Jung, S Lee, J Kim Current Applied Physics 14 (9), 1263-1272, 2014 | 29 | 2014 |
Three-dimensional volume-conserving immersed boundary model for two-phase fluid flows Y Li, A Yun, D Lee, J Shin, D Jeong, J Kim Computer Methods in Applied Mechanics and Engineering 257, 36-46, 2013 | 29 | 2013 |
Numerical simulation of the zebra pattern formation on a three-dimensional model D Jeong, Y Li, Y Choi, M Yoo, D Kang, J Park, J Choi, J Kim Physica A: Statistical Mechanics and its Applications 475, 106-116, 2017 | 28 | 2017 |
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 |