| Year |
Citation |
Score |
| 2022 |
Ham S, Li Y, Jeong D, Lee C, Kwak S, Hwang Y, Kim J. An Explicit Adaptive Finite Difference Method for the Cahn-Hilliard Equation. Journal of Nonlinear Science. 32: 80. PMID 36089998 DOI: 10.1007/s00332-022-09844-3 |
0.409 |
|
| 2021 |
Lee HG, Yang J, Kim S, Kim J. Modeling and simulation of droplet evaporation using a modified Cahn–Hilliard equation Applied Mathematics and Computation. 390: 125591. DOI: 10.1016/J.Amc.2020.125591 |
0.497 |
|
| 2020 |
Jeong D, Li Y, Lee C, Yang J, Kim J. A conservative numerical method for the Cahn-Hilliard equation with generalized mobilities on curved surfaces in three-dimensional space Communications in Computational Physics. 27: 412-430. DOI: 10.4208/Cicp.Oa-2018-0202 |
0.434 |
|
| 2020 |
Lee C, Yoon S, Park J, Kim J. An Explicit Hybrid Method for the Nonlocal Allen–Cahn Equation Symmetry. 12: 1218. DOI: 10.3390/Sym12081218 |
0.525 |
|
| 2020 |
Yoon S, Park J, Wang J, Lee C, Kim J. Numerical simulation of dendritic pattern formation in an isotropic crystal growth model on curved surfaces Symmetry. 12: 1155. DOI: 10.3390/Sym12071155 |
0.372 |
|
| 2020 |
Kim S, Kim J. Automatic Binary Data Classification Using a Modified Allen-Cahn Equation International Journal of Pattern Recognition and Artificial Intelligence. DOI: 10.1142/S0218001421500130 |
0.371 |
|
| 2020 |
Yang J, Li Y, Kim J. A practical finite difference scheme for the Navier–Stokes equation on curved surfaces in R3 Journal of Computational Physics. 411: 109403. DOI: 10.1016/J.Jcp.2020.109403 |
0.482 |
|
| 2020 |
Yang J, Kim J. An unconditionally stable second-order accurate method for systems of Cahn–Hilliard equations Communications in Nonlinear Science and Numerical Simulation. 87: 105276. DOI: 10.1016/J.Cnsns.2020.105276 |
0.469 |
|
| 2020 |
Lee HG, Yang J, Kim J. Pinning boundary conditions for phase-field models Communications in Nonlinear Science and Numerical Simulation. 82: 105060. DOI: 10.1016/J.Cnsns.2019.105060 |
0.399 |
|
| 2020 |
Yang J, Kim J. A phase-field model and its efficient numerical method for two-phase flows on arbitrarily curved surfaces in 3D space Computer Methods in Applied Mechanics and Engineering. 372: 113382. DOI: 10.1016/J.Cma.2020.113382 |
0.491 |
|
| 2020 |
Kim H, Yun A, Yoon S, Lee C, Park J, Kim J. Pattern formation in reaction–diffusion systems on evolving surfaces Computers & Mathematics With Applications. 80: 2019-2028. DOI: 10.1016/J.Camwa.2020.08.026 |
0.357 |
|
| 2020 |
Yang J, Kim J. A phase-field method for two-phase fluid flow in arbitrary domains Computers & Mathematics With Applications. 79: 1857-1874. DOI: 10.1016/J.Camwa.2019.10.008 |
0.47 |
|
| 2020 |
Wang J, Li Y, Choi Y, Lee C, Kim J. Fast and Accurate Smoothing Method Using A Modified Allen–Cahn Equation Computer-Aided Design. 120: 102804. DOI: 10.1016/J.Cad.2019.102804 |
0.488 |
|
| 2020 |
Kim H, Yoon S, Wang J, Lee C, Kim S, Park J, Kim J. Shape transformation using the modified Allen–Cahn equation Applied Mathematics Letters. 107: 106487. DOI: 10.1016/J.Aml.2020.106487 |
0.469 |
|
| 2020 |
Yang J, Kim H, Lee C, Kim S, Wang J, Yoon S, Park J, Kim J. Phase-field modeling and computer simulation of the coffee-ring effect Theoretical and Computational Fluid Dynamics. 1-14. DOI: 10.1007/S00162-020-00544-W |
0.403 |
|
| 2019 |
Jeong D, Li Y, Kim S, Choi Y, Lee C, Kim J. Mathematical modeling and computer simulation of the three-dimensional pattern formation of honeycombs. Scientific Reports. 9: 20364. PMID 31889154 DOI: 10.1038/S41598-019-56942-6 |
0.409 |
|
| 2019 |
Lee S, Kim J. Effective Time Step Analysis of a Nonlinear Convex Splitting Scheme for the Cahn–Hilliard Equation Communications in Computational Physics. 25. DOI: 10.4208/Cicp.Oa-2017-0260 |
0.43 |
|
| 2019 |
Kim J, Lee HG. A nonlinear convex splitting fourier spectral scheme for the Cahn–Hilliard equation with a logarithmic free energy Bulletin of the Korean Mathematical Society. 56: 265-276. DOI: 10.4134/Bkms.B180238 |
0.403 |
|
| 2019 |
Lee HG, Park J, Yoon S, Lee C, Kim J. Mathematical Model and Numerical Simulation for Tissue Growth on Bioscaffolds Applied Sciences. 9: 4058. DOI: 10.3390/App9194058 |
0.302 |
|
| 2019 |
Jeong D, Li Y, Lee C, Yang J, Choi Y, Kim J. Verification of Convergence Rates of Numerical Solutions for Parabolic Equations Mathematical Problems in Engineering. 2019: 1-10. DOI: 10.1155/2019/8152136 |
0.434 |
|
| 2019 |
Wang J, Kim J. Applying Least Squares Support Vector Machines to Mean-Variance Portfolio Analysis Mathematical Problems in Engineering. 2019: 4189683. DOI: 10.1155/2019/4189683 |
0.302 |
|
| 2019 |
Shin J, Choi Y, Kim J. The Cahn–Hilliard Equation with Generalized Mobilities in Complex Geometries Mathematical Problems in Engineering. 2019: 1-10. DOI: 10.1155/2019/1710270 |
0.423 |
|
| 2019 |
Li Y, Wang J, Lu B, Jeong D, Kim J. Multicomponent volume reconstruction from slice data using a modified multicomponent Cahn–Hilliard system Pattern Recognition. 93: 124-133. DOI: 10.1016/J.Patcog.2019.04.006 |
0.416 |
|
| 2019 |
Jeong D, Kim J. Fast and accurate adaptive finite difference method for dendritic growth Computer Physics Communications. 236: 95-103. DOI: 10.1016/J.Cpc.2018.10.020 |
0.484 |
|
| 2019 |
Jeong D, Yang J, Kim J. A practical and efficient numerical method for the Cahn–Hilliard equation in complex domains Communications in Nonlinear Science and Numerical Simulation. 73: 217-228. DOI: 10.1016/J.Cnsns.2019.02.009 |
0.454 |
|
| 2019 |
Li Y, Jeong D, Kim H, Lee C, Kim J. Comparison study on the different dynamics between the Allen–Cahn and the Cahn–Hilliard equations Computers & Mathematics With Applications. 77: 311-322. DOI: 10.1016/J.Camwa.2018.09.034 |
0.418 |
|
| 2019 |
Li Y, Luo C, Xia B, Kim J. An efficient linear second order unconditionally stable direct discretization method for the phase-field crystal equation on surfaces Applied Mathematical Modelling. 67: 477-490. DOI: 10.1016/J.Apm.2018.11.012 |
0.524 |
|
| 2019 |
Yang J, Li Y, Lee C, Jeong D, Kim J. A conservative finite difference scheme for the N-component Cahn–Hilliard system on curved surfaces in 3D Journal of Engineering Mathematics. 119: 149-166. DOI: 10.1007/S10665-019-10023-9 |
0.439 |
|
| 2019 |
Jang H, Kim S, Han J, Lee S, Ban J, Han H, Lee C, Jeong D, Kim J. Fast Monte Carlo Simulation for Pricing Equity-Linked Securities Computational Economics. 1-18. DOI: 10.1007/S10614-019-09947-2 |
0.324 |
|
| 2019 |
Jeong D, Yoo M, Yoo C, Kim J. A Hybrid Monte Carlo and Finite Difference Method for Option Pricing Computational Economics. 53: 111-124. DOI: 10.1007/S10614-017-9730-4 |
0.424 |
|
| 2019 |
Yang J, Li Y, Lee C, Kim J. Conservative Allen–Cahn equation with a nonstandard variable mobility Acta Mechanica. 231: 561-576. DOI: 10.1007/S00707-019-02548-Y |
0.384 |
|
| 2018 |
Choi J, Whang S, Kim J. Forced capillary gravity surface waves over a bump – Critical surface tension case Anziam Journal. 59: 77-96. DOI: 10.21914/Anziamj.V59I0.12634 |
0.353 |
|
| 2018 |
Jeong D, Li Y, Lee HJ, Lee SM, Yang J, Park S, Kim H, Choi Y, Kim J. Efficient 3D Volume Reconstruction from a Point Cloud Using a Phase-Field Method Mathematical Problems in Engineering. 2018: 7090186. DOI: 10.1155/2018/7090186 |
0.401 |
|
| 2018 |
Jin Y, Wang J, Kim S, Heo Y, Yoo C, Kim Y, Kim J, Jeong D. Reconstruction of the Time-Dependent Volatility Function Using the Black–Scholes Model Discrete Dynamics in Nature and Society. 2018: 3093708. DOI: 10.1155/2018/3093708 |
0.345 |
|
| 2018 |
Yang J, Kim J. Phase-field simulation of Rayleigh instability on a fibre International Journal of Multiphase Flow. 105: 84-90. DOI: 10.1016/J.Ijmultiphaseflow.2018.03.019 |
0.426 |
|
| 2018 |
Li H, Li Y, Yu R, Sun J, Kim J. Surface reconstruction from unorganized points with l0 gradient minimization Computer Vision and Image Understanding. 169: 108-118. DOI: 10.1016/J.Cviu.2018.01.009 |
0.34 |
|
| 2018 |
Jeong D, Choi Y, Kim J. Modeling and simulation of the hexagonal pattern formation of honeycombs by the immersed boundary method Communications in Nonlinear Science and Numerical Simulation. 62: 61-77. DOI: 10.1016/J.Cnsns.2018.02.024 |
0.355 |
|
| 2018 |
Jeong D, Choi Y, Kim J. A benchmark problem for the two- and three-dimensional Cahn–Hilliard equations Communications in Nonlinear Science and Numerical Simulation. 61: 149-159. DOI: 10.1016/J.Cnsns.2018.02.006 |
0.454 |
|
| 2018 |
Jeong D, Kim J. An explicit hybrid finite difference scheme for the Allen–Cahn equation Journal of Computational and Applied Mathematics. 340: 247-255. DOI: 10.1016/J.Cam.2018.02.026 |
0.511 |
|
| 2018 |
Li Y, Qi X, Kim J. Direct Discretization Method for the Cahn–Hilliard Equation on an Evolving Surface Journal of Scientific Computing. 77: 1147-1163. DOI: 10.1007/S10915-018-0742-6 |
0.469 |
|
| 2018 |
Jeong D, Kim J. A Projection Method for the Conservative Discretizations of Parabolic Partial Differential Equations Journal of Scientific Computing. 75: 332-349. DOI: 10.1007/S10915-017-0536-2 |
0.491 |
|
| 2018 |
Jeong D, Yoo M, Kim J. Finite Difference Method for the Black–Scholes Equation Without Boundary Conditions Computational Economics. 51: 961-972. DOI: 10.1007/S10614-017-9653-0 |
0.49 |
|
| 2017 |
Kim J, Shin J. An Unconditionally Gradient Stable Numerical Method For The Ohta-Kawasaki Model Bulletin of the Korean Mathematical Society. 54: 145-158. DOI: 10.4134/Bkms.B150980 |
0.41 |
|
| 2017 |
Choi Y, Jeong D, Kim J. Curve and Surface Smoothing Using a Modified Cahn-Hilliard Equation Mathematical Problems in Engineering. 2017: 5971295. DOI: 10.1155/2017/5971295 |
0.468 |
|
| 2017 |
Li Y, Choi JI, Choic Y, Kim J. A simple and efficient outflow boundary condition for the incompressible Navier–Stokes equations Engineering Applications of Computational Fluid Mechanics. 11: 69-85. DOI: 10.1080/19942060.2016.1247296 |
0.427 |
|
| 2017 |
Jeong D, Li Y, Choi Y, Yoo M, Kang D, Park J, Choi J, Kim J. Numerical simulation of the zebra pattern formation on a three-dimensional model Physica a-Statistical Mechanics and Its Applications. 475: 106-116. DOI: 10.1016/J.Physa.2017.02.014 |
0.425 |
|
| 2017 |
Kim J, Jeong D, Yang S, Choi Y. A finite difference method for a conservative AllenCahn equation on non-flat surfaces Journal of Computational Physics. 334: 170-181. DOI: 10.1016/J.Jcp.2016.12.060 |
0.507 |
|
| 2017 |
Kim J, Lee HG. A new conservative vector-valued Allen–Cahn equation and its fast numerical method Computer Physics Communications. 221: 102-108. DOI: 10.1016/J.Cpc.2017.08.006 |
0.477 |
|
| 2017 |
Lee S, Li Y, Shin J, Kim J. Phase-field simulations of crystal growth in a two-dimensional cavity flow Computer Physics Communications. 216: 84-94. DOI: 10.1016/J.Cpc.2017.03.005 |
0.366 |
|
| 2017 |
Jeong D, Kim J. Conservative Allen–Cahn–Navier–Stokes system for incompressible two-phase fluid flows Computers & Fluids. 156: 239-246. DOI: 10.1016/J.Compfluid.2017.07.009 |
0.416 |
|
| 2017 |
Li Y, Kim J, Wang N. An unconditionally energy-stable second-order time-accurate scheme for the Cahn–Hilliard equation on surfaces Communications in Nonlinear Science and Numerical Simulation. 53: 213-227. DOI: 10.1016/J.Cnsns.2017.05.006 |
0.468 |
|
| 2017 |
Li Y, Kim J. An efficient and stable compact fourth-order finite difference scheme for the phase field crystal equation Computer Methods in Applied Mechanics and Engineering. 319: 194-216. DOI: 10.1016/J.Cma.2017.02.022 |
0.482 |
|
| 2017 |
Li Y, Choi Y, Kim J. Computationally efficient adaptive time step method for the CahnHilliard equation Computers & Mathematics With Applications. 73: 1855-1864. DOI: 10.1016/J.Camwa.2017.02.021 |
0.388 |
|
| 2017 |
Jeong D, Kim J. Phase-field model and its splitting numerical scheme for tissue growth Applied Numerical Mathematics. 117: 22-35. DOI: 10.1016/J.Apnum.2017.01.020 |
0.518 |
|
| 2017 |
Choi Y, Jeong D, Kim J. A multigrid solution for the Cahn–Hilliard equation on nonuniform grids Applied Mathematics and Computation. 293: 320-333. DOI: 10.1016/J.Amc.2016.08.026 |
0.47 |
|
| 2016 |
Jeong D, Choi Y, Kim J. Numerical investigation of local defectiveness control of diblock copolymer patterns Condensed Matter Physics. 19: 33001. DOI: 10.5488/Cmp.19.33001 |
0.451 |
|
| 2016 |
Lee S, Jeong D, Choi Y, Kim J. Comparison Of Numerical Methods For Ternary Fluid Flows: Immersed Boundary, Level-Set, And Phase-Field Methods Journal of the Korean Society For Industrial and Applied Mathematics. 20: 83-106. DOI: 10.12941/Jksiam.2016.20.083 |
0.473 |
|
| 2016 |
Kim J, Lee S, Choi Y, Lee SM, Jeong D. Basic Principles and Practical Applications of the Cahn–Hilliard Equation Mathematical Problems in Engineering. 2016: 9532608. DOI: 10.1155/2016/9532608 |
0.42 |
|
| 2016 |
Jeong D, Yoo M, Kim J. Accurate and Efficient Computations of the Greeks for Options Near Expiry Using the Black-Scholes Equations Discrete Dynamics in Nature and Society. 2016. DOI: 10.1155/2016/1586786 |
0.471 |
|
| 2016 |
Jeong D, Kim J. A practical numerical scheme for the ternary Cahn-Hilliard system with a logarithmic free energy Physica a: Statistical Mechanics and Its Applications. 442: 510-522. DOI: 10.1016/J.Physa.2015.09.038 |
0.475 |
|
| 2016 |
Lee D, Kim J. Comparison study of the conservative Allen-Cahn and the Cahn-Hilliard equations Mathematics and Computers in Simulation. 119: 35-56. DOI: 10.1016/J.Matcom.2015.08.018 |
0.454 |
|
| 2016 |
Li Y, Choi JI, Kim J. Multi-component Cahn–Hilliard system with different boundary conditions in complex domains Journal of Computational Physics. 323: 1-16. DOI: 10.1016/J.Jcp.2016.07.017 |
0.42 |
|
| 2016 |
Kim J, Kim T, Jo J, Choi Y, Lee S, Hwang H, Yoo M, Jeong D. A practical finite difference method for the three-dimensional Black-Scholes equation European Journal of Operational Research. 252: 183-190. DOI: 10.1016/J.Ejor.2015.12.012 |
0.496 |
|
| 2016 |
Li Y, Lee HG, Xia B, Kim J. A compact fourth-order finite difference scheme for the three-dimensional Cahn-Hilliard equation Computer Physics Communications. 200: 108-116. DOI: 10.1016/J.Cpc.2015.11.006 |
0.46 |
|
| 2016 |
Jeong D, Lee S, Lee D, Shin J, Kim J. Comparison study of numerical methods for solving the Allen-Cahn equation Computational Materials Science. 111: 131-136. DOI: 10.1016/J.Commatsci.2015.09.005 |
0.487 |
|
| 2016 |
Li Y, Choi JI, Kim J. A phase-field fluid modeling and computation with interfacial profile correction term Communications in Nonlinear Science and Numerical Simulation. 30: 84-100. DOI: 10.1016/J.Cnsns.2015.06.012 |
0.419 |
|
| 2016 |
Lee HG, Kim J. A simple and efficient finite difference method for the phase-field crystal equation on curved surfaces Computer Methods in Applied Mechanics and Engineering. 307: 32-43. DOI: 10.1016/J.Cma.2016.04.022 |
0.494 |
|
| 2016 |
Lee S, Jeong D, Lee W, Kim J. An Immersed Boundary Method for a Contractile Elastic Ring in a Three-Dimensional Newtonian Fluid Journal of Scientific Computing. 67: 909-925. DOI: 10.1007/S10915-015-0110-8 |
0.416 |
|
| 2016 |
Jeong D, Kim J. Practical estimation of a splitting parameter for a spectral method for the ternary Cahn-Hilliard system with a logarithmic free energy Mathematical Methods in the Applied Sciences. DOI: 10.1002/Mma.4093 |
0.349 |
|
| 2015 |
Lee HG, Kim Y, Kim J. Mathematical model and its fast numerical method for the tumor growth. Mathematical Biosciences and Engineering : Mbe. 12: 1173-87. PMID 26775855 DOI: 10.3934/Mbe.2015.12.1173 |
0.429 |
|
| 2015 |
Li Y, Kim J. Three-dimensional simulations of the cell growth and cytokinesis using the immersed boundary method. Mathematical Biosciences. PMID 26620886 DOI: 10.1016/J.Mbs.2015.11.005 |
0.397 |
|
| 2015 |
Jeong D, Kim J. Microphase separation patterns in diblock copolymers on curved surfaces using a nonlocal Cahn-Hilliard equation. The European Physical Journal. E, Soft Matter. 38: 117. PMID 26577816 DOI: 10.1140/Epje/I2015-15117-1 |
0.474 |
|
| 2015 |
Choi Y, Jeong D, Kim J, Kim YR, Lee S, Seo S, Yoo M. Robust and accurate method for the black-scholes equations with payoff-consistent extrapolation Communications of the Korean Mathematical Society. 30: 297-311. DOI: 10.4134/Ckms.2015.30.3.297 |
0.431 |
|
| 2015 |
Choi Y, Jeong D, Lee S, Kim J. Numerical Implementation Of The Two-Dimensional Incompressible Navier–Stokes Equation Journal of the Korean Society For Industrial and Applied Mathematics. 19: 103-121. DOI: 10.12941/Jksiam.2015.19.103 |
0.461 |
|
| 2015 |
Lee S, Choi Y, Lee D, Jo H, Lee S, Myung S, Kim J. A Modified Cahn-Hilliard Equation For 3D Volume Reconstruction From Two Planar Cross Sections Journal of the Korean Society For Industrial and Applied Mathematics. 19: 47-56. DOI: 10.12941/Jksiam.2015.19.047 |
0.3 |
|
| 2015 |
Jeong D, Seo S, Hwang H, Lee D, Choi Y, Kim J. Accuracy, Robustness, and Efficiency of the Linear Boundary Condition for the Black-Scholes Equations Discrete Dynamics in Nature and Society. 2015: 359028. DOI: 10.1155/2015/359028 |
0.417 |
|
| 2015 |
Yun A, Shin J, Li Y, Lee S, Kim J. Numerical Study of Periodic Traveling Wave Solutions for the Predator–Prey Model with Landscape Features International Journal of Bifurcation and Chaos. 25: 1550117. DOI: 10.1142/S0218127415501175 |
0.326 |
|
| 2015 |
Jeong D, Lee S, Kim J. An efficient numerical method for evolving microstructures with strong elastic inhomogeneity Modelling and Simulation in Materials Science and Engineering. 23: 45007. DOI: 10.1088/0965-0393/23/4/045007 |
0.428 |
|
| 2015 |
Lee D, Kim J. Mean curvature flow by the Allen–Cahn equation European Journal of Applied Mathematics. 26: 535-559. DOI: 10.1017/S0956792515000200 |
0.474 |
|
| 2015 |
Lee HG, Kim J. An efficient numerical method for simulating multiphase flows using a diffuse interface model Physica a-Statistical Mechanics and Its Applications. 423: 33-50. DOI: 10.1016/J.Physa.2014.12.027 |
0.457 |
|
| 2015 |
Li Y, Kim J. Fast and efficient narrow volume reconstruction from scattered data Pattern Recognition. 48: 4057-4069. DOI: 10.1016/J.Patcog.2015.06.014 |
0.409 |
|
| 2015 |
Choi Y, Jeong D, Lee S, Yoo M, Kim J. Motion by mean curvature of curves on surfaces using the Allen-Cahn equation International Journal of Engineering Science. 97: 126-132. DOI: 10.1016/J.Ijengsci.2015.10.002 |
0.508 |
|
| 2015 |
Lee HG, Kim J. Numerical investigation of falling bacterial plumes caused by bioconvection in a three-dimensional chamber European Journal of Mechanics B-Fluids. 52: 120-130. DOI: 10.1016/J.Euromechflu.2015.03.002 |
0.42 |
|
| 2015 |
Lee HG, Kim J. Two-dimensional Kelvin–Helmholtz instabilities of multi-component fluids European Journal of Mechanics B-Fluids. 49: 77-88. DOI: 10.1016/J.Euromechflu.2014.08.001 |
0.449 |
|
| 2015 |
Li Y, Jeong D, Choi J, Lee S, Kim J. Fast local image inpainting based on the Allen-Cahn model Digital Signal Processing. 37: 65-74. DOI: 10.1016/J.Dsp.2014.11.006 |
0.458 |
|
| 2015 |
Li Y, Shin J, Choi Y, Kim J. Three-dimensional volume reconstruction from slice data using phase-field models Computer Vision and Image Understanding. 137: 115-124. DOI: 10.1016/J.Cviu.2015.02.001 |
0.483 |
|
| 2015 |
Jeong D, Lee S, Choi Y, Kim J. Energy-minimizing wavelengths of equilibrium states for diblock copolymers in the hex-cylinder phase Current Applied Physics. 15: 799-804. DOI: 10.1016/J.Cap.2015.04.033 |
0.423 |
|
| 2015 |
Shin J, Jeong D, Li Y, Choi Y, Kim J. A hybrid numerical method for the phase‐field model of fluid vesicles in three‐dimensional space International Journal For Numerical Methods in Fluids. 78: 63-75. DOI: 10.1002/Fld.4007 |
0.464 |
|
| 2014 |
Jeong D, Kim S, Choi Y, Hwang H, Kim J. Comparison Of Numerical Methods (Bi-Cgstab, Os, Mg) For The 2D Black-Scholes Equation Pure and Applied Mathematics. 21: 129-139. DOI: 10.7468/Jksmeb.2014.21.2.129 |
0.481 |
|
| 2014 |
Jeong D, Ha T, Kim M, Shin J, Yoon IH, Kim J. An Adaptive Finite Difference Method Using Far-Field Boundary Conditions For The Black-Scholes Equation Bulletin of the Korean Mathematical Society. 51: 1087-1100. DOI: 10.4134/Bkms.2014.51.4.1087 |
0.469 |
|
| 2014 |
Shin J, Choi Y, Kim J. An unconditionally stable numerical method for the viscous Cahn--Hilliard equation Discrete and Continuous Dynamical Systems-Series B. 19: 1737-1747. DOI: 10.3934/Dcdsb.2014.19.1737 |
0.512 |
|
| 2014 |
Lee S, Li Y, Choi Y, Hwang H, Kim J. Accurate And Efficient Computations For The Greeks Of European Multi-Asset Options Journal of the Korean Society For Industrial and Applied Mathematics. 18: 61-74. DOI: 10.12941/Jksiam.2014.18.061 |
0.444 |
|
| 2014 |
Hua H, Shin J, Kim J. Level Set, Phase-Field, and Immersed Boundary Methods for Two-Phase Fluid Flows Journal of Fluids Engineering-Transactions of the Asme. 136: 21301. DOI: 10.1115/1.4025658 |
0.431 |
|
| 2014 |
Lee C, Jeong D, Shin J, Li Y, Kim J. A fourth-order spatial accurate and practically stable compact scheme for the Cahn-Hilliard equation Physica a-Statistical Mechanics and Its Applications. 409: 17-28. DOI: 10.1016/J.Physa.2014.04.038 |
0.438 |
|
| 2014 |
Hua H, Shin J, Kim J. Dynamics of a compound droplet in shear flow International Journal of Heat and Fluid Flow. 50: 63-71. DOI: 10.1016/J.Ijheatfluidflow.2014.05.007 |
0.393 |
|
| 2014 |
Kim J, Lee S, Choi Y. A conservative Allen–Cahn equation with a space–time dependent Lagrange multiplier International Journal of Engineering Science. 84: 11-17. DOI: 10.1016/J.Ijengsci.2014.06.004 |
0.479 |
|
| 2014 |
Li Y, Lee D, Lee C, Lee J, Lee S, Kim J, Ahn S, Kim J. Surface embedding narrow volume reconstruction from unorganized points Computer Vision and Image Understanding. 121: 100-107. DOI: 10.1016/J.Cviu.2014.02.002 |
0.489 |
|
| 2014 |
Lee D, Huh JY, Jeong D, Shin J, Yun A, Kim J. Physical, mathematical, and numerical derivations of the Cahn–Hilliard equation Computational Materials Science. 81: 216-225. DOI: 10.1016/J.Commatsci.2013.08.027 |
0.438 |
|
| 2014 |
Lee HG, Kim J. A simple and robust boundary treatment for the forced Korteweg–de Vries equation Communications in Nonlinear Science and Numerical Simulation. 19: 2262-2271. DOI: 10.1016/J.Cnsns.2013.12.019 |
0.438 |
|
| 2014 |
Jeong D, Shin J, Li Y, Choi Y, Jung JH, Lee S, Kim J. Numerical analysis of energy-minimizing wavelengths of equilibrium states for diblock copolymers Current Applied Physics. 14: 1263-1272. DOI: 10.1016/J.Cap.2014.06.016 |
0.455 |
|
| 2014 |
Jeong D, Kim J. An accurate and robust numerical method for micromagnetics simulations Current Applied Physics. 14: 476-483. DOI: 10.1016/J.Cap.2013.12.028 |
0.457 |
|
| 2014 |
Kim J, Jeong D, Shin D. A regime-switching model with the volatility smile for two-asset European options Automatica. 50: 747-755. DOI: 10.1016/J.Automatica.2013.12.019 |
0.302 |
|
| 2014 |
Li Y, Kim J. An unconditionally stable hybrid method for image segmentation Applied Numerical Mathematics. 82: 32-43. DOI: 10.1016/J.Apnum.2013.12.010 |
0.507 |
|
| 2014 |
Shin J, Park SK, Kim J. A hybrid FEM for solving the Allen-Cahn equation Applied Mathematics and Computation. 244: 606-612. DOI: 10.1016/J.Amc.2014.07.040 |
0.509 |
|
| 2014 |
Yun A, Li Y, Kim J. A new phase-field model for a water-oil-surfactant system Applied Mathematics and Computation. 229: 422-432. DOI: 10.1016/J.Amc.2013.12.054 |
0.369 |
|
| 2014 |
Li Y, Jeong D, Kim J. Adaptive mesh refinement for simulation of thin film flows Meccanica. 49: 239-252. DOI: 10.1007/S11012-013-9788-6 |
0.458 |
|
| 2013 |
Yun A, Lee SH, Kim J. A phase-field model for articular cartilage regeneration in degradable scaffolds. Bulletin of Mathematical Biology. 75: 2389-409. PMID 24072660 DOI: 10.1007/S11538-013-9897-3 |
0.351 |
|
| 2013 |
Jeong D, Li Y, Choi Y, Moon K, Kim J. An Adaptive Multigrid Technique For Option Pricing Under The Black-Scholes Model Journal of the Korean Society For Industrial and Applied Mathematics. 17: 295-306. DOI: 10.12941/Jksiam.2013.17.295 |
0.452 |
|
| 2013 |
Lee S, Lee C, Lee HG, Kim J. Comparison Of Different Numerical Schemes For The Cahn-Hilliard Equation Journal of the Korean Society For Industrial and Applied Mathematics. 17: 197-207. DOI: 10.12941/Jksiam.2013.17.197 |
0.451 |
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| 2013 |
Hua H, Li Y, Shin J, Song H, Kim J. Effect of confinement on droplet deformation in shear flow International Journal of Computational Fluid Dynamics. 27: 317-331. DOI: 10.1080/10618562.2013.857406 |
0.385 |
|
| 2013 |
Lee HG, Kim J. Buoyancy-driven mixing of multi-component fluids in two-dimensional tilted channels European Journal of Mechanics B-Fluids. 42: 37-46. DOI: 10.1016/J.Euromechflu.2013.06.004 |
0.434 |
|
| 2013 |
Li Y, Kim J. Numerical investigations on self-similar solutions of the nonlinear diffusion equation European Journal of Mechanics B-Fluids. 42: 30-36. DOI: 10.1016/J.Euromechflu.2013.05.003 |
0.319 |
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| 2013 |
Shin J, Kim S, Lee D, Kim J. A parallel multigrid method of the Cahn–Hilliard equation Computational Materials Science. 71: 89-96. DOI: 10.1016/J.Commatsci.2013.01.008 |
0.524 |
|
| 2013 |
Li Y, Yun A, Lee D, Shin J, Jeong D, Kim J. Three-dimensional volume-conserving immersed boundary model for two-phase fluid flows Computer Methods in Applied Mechanics and Engineering. 257: 36-46. DOI: 10.1016/J.Cma.2013.01.009 |
0.414 |
|
| 2013 |
Lee HG, Kim J. Numerical simulation of the three-dimensional Rayleigh-Taylor instability Computers & Mathematics With Applications. 66: 1466-1474. DOI: 10.1016/J.Camwa.2013.08.021 |
0.36 |
|
| 2013 |
Li Y, Jeong D, Shin J, Kim J. A conservative numerical method for the Cahn-Hilliard equation with Dirichlet boundary conditions in complex domains Computers & Mathematics With Applications. 65: 102-115. DOI: 10.1016/J.Camwa.2012.08.018 |
0.502 |
|
| 2013 |
Jeong D, Kim J. A comparison study of ADI and operator splitting methods on option pricing models Journal of Computational and Applied Mathematics. 247: 162-171. DOI: 10.1016/J.Cam.2013.01.008 |
0.431 |
|
| 2013 |
Lee CH, Shin J, Kim J. A numerical characteristic method for probability generating functions on stochastic first-order reaction networks Journal of Mathematical Chemistry. 51: 316-337. DOI: 10.1007/S10910-012-0085-8 |
0.455 |
|
| 2012 |
Li Y, Yun A, Kim J. An immersed boundary method for simulating a single axisymmetric cell growth and division. Journal of Mathematical Biology. 65: 653-75. PMID 21987086 DOI: 10.1007/S00285-011-0476-7 |
0.399 |
|
| 2012 |
Jeong D, Yun A, Kim J. Mathematical model and numerical simulation of the cell growth in scaffolds. Biomechanics and Modeling in Mechanobiology. 11: 677-88. PMID 21830072 DOI: 10.1007/S10237-011-0342-Y |
0.386 |
|
| 2012 |
Kim J. Phase-Field Models for Multi-Component Fluid Flows Communications in Computational Physics. 12: 613-661. DOI: 10.4208/Cicp.301110.040811A |
0.382 |
|
| 2012 |
Li Y, Lee D, Lee HG, Jeong D, Lee C, Yang D, Kim J. A Robust And Accurate Phase-Field Simulation Of Snow Crystal Growth Journal of the Korean Society For Industrial and Applied Mathematics. 16: 15-29. DOI: 10.12941/Jksiam.2012.16.1.015 |
0.397 |
|
| 2012 |
Jeong D, Wee I, Kim J. An Operator Splitting Method For Pricing The Els Option Journal of the Korean Society For Industrial and Applied Mathematics. 14: 175-187. DOI: 10.12941/Jksiam.2010.14.3.175 |
0.463 |
|
| 2012 |
Yun A, Jeong D, Kim J. An Efficient And Accurate Numerical Scheme For Turing Instability On A Predator-Prey Model International Journal of Bifurcation and Chaos. 22: 1250139. DOI: 10.1142/S0218127412501398 |
0.443 |
|
| 2012 |
Li Y, Kim J. A comparison study of phase-field models for an immiscible binary mixture with surfactant European Physical Journal B. 85: 340. DOI: 10.1140/Epjb/E2012-30184-1 |
0.386 |
|
| 2012 |
Lee HG, Choi JW, Kim J. A practically unconditionally gradient stable scheme for the N-component Cahn-Hilliard system Physica a-Statistical Mechanics and Its Applications. 391: 1009-1019. DOI: 10.1016/J.Physa.2011.11.032 |
0.418 |
|
| 2012 |
Li Y, Kim J. Phase-field simulations of crystal growth with adaptive mesh refinement International Journal of Heat and Mass Transfer. 55: 7926-7932. DOI: 10.1016/J.Ijheatmasstransfer.2012.08.009 |
0.363 |
|
| 2012 |
Lee HG, Kim J. An efficient and accurate numerical algorithm for the vector-valued Allen–Cahn equations Computer Physics Communications. 183: 2107-2115. DOI: 10.1016/J.Cpc.2012.05.013 |
0.454 |
|
| 2012 |
Li Y, Kim J. An unconditionally stable numerical method for bimodal image segmentation Applied Mathematics and Computation. 219: 3083-3090. DOI: 10.1016/J.Amc.2012.09.038 |
0.39 |
|
| 2012 |
Lee HG, Kim J. A comparison study of the Boussinesq and the variable density models on buoyancy-driven flows Journal of Engineering Mathematics. 75: 15-27. DOI: 10.1007/S10665-011-9504-2 |
0.38 |
|
| 2012 |
Lee HG, Kim J. Regularized Dirac delta functions for phase field models International Journal For Numerical Methods in Engineering. 91: 269-288. DOI: 10.1002/Nme.4262 |
0.345 |
|
| 2012 |
Li Y, Jung E, Lee W, Lee HG, Kim J. Volume preserving immersed boundary methods for two-phase fluid flows International Journal For Numerical Methods in Fluids. 69: 842-858. DOI: 10.1002/Fld.2616 |
0.411 |
|
| 2011 |
Li Y, Lee HG, Kim J. A fast, robust, and accurate operator splitting method for phase-field simulations of crystal growth Journal of Crystal Growth. 321: 176-182. DOI: 10.1016/J.Jcrysgro.2011.02.042 |
0.489 |
|
| 2011 |
Shin J, Jeong D, Kim J. A conservative numerical method for the Cahn-Hilliard equation in complex domains Journal of Computational Physics. 230: 7441-7455. DOI: 10.1016/J.Jcp.2011.06.009 |
0.477 |
|
| 2011 |
Lee HG, Kim J. Accurate contact angle boundary conditions for the Cahn–Hilliard equations Computers & Fluids. 44: 178-186. DOI: 10.1016/J.Compfluid.2010.12.031 |
0.446 |
|
| 2011 |
Li Y, Kim J. Multiphase image segmentation using a phase-field model Computers & Mathematics With Applications. 62: 737-745. DOI: 10.1016/J.Camwa.2011.05.054 |
0.49 |
|
| 2011 |
Lee HG, Kim K, Kim J. On the long time simulation of the Rayleigh–Taylor instability International Journal For Numerical Methods in Engineering. 85: 1633-1647. DOI: 10.1002/Nme.3034 |
0.326 |
|
| 2011 |
Li Y, Lee HG, Yoon D, Hwang W, Shin S, Ha Y, Kim J. Numerical studies of the fingering phenomena for the thin film equation International Journal For Numerical Methods in Fluids. 67: 1358-1372. DOI: 10.1002/Fld.2420 |
0.367 |
|
| 2010 |
Li Y, Kim J. A Fast And Accurate Numerical Method For Medical Image Segmentation Journal of the Korean Society For Industrial and Applied Mathematics. 14: 201-210. DOI: 10.12941/Jksiam.2010.14.4.201 |
0.434 |
|
| 2010 |
Yang S, Lee HG, Kim J. A phase-field approach for minimizing the area of triply periodic surfaces with volume constraint Computer Physics Communications. 181: 1037-1046. DOI: 10.1016/J.Cpc.2010.02.010 |
0.335 |
|
| 2010 |
Li Y, Lee HG, Jeong D, Kim J. An unconditionally stable hybrid numerical method for solving the Allen-Cahn equation Computers & Mathematics With Applications. 60: 1591-1606. DOI: 10.1016/J.Camwa.2010.06.041 |
0.515 |
|
| 2010 |
Jeong D, Kim J. A Crank-Nicolson scheme for the Landau-Lifshitz equation without damping Journal of Computational and Applied Mathematics. 234: 613-623. DOI: 10.1016/J.Cam.2010.01.002 |
0.519 |
|
| 2009 |
Jeong D, Kim J, Wee I. An Accurate And Efficient Numerical Method For Black-Scholes Equations Communications of the Korean Mathematical Society. 24: 617-628. DOI: 10.4134/Ckms.2009.24.4.617 |
0.457 |
|
| 2009 |
Kim C, Shin SH, Lee HG, Kim J. Phase-field model for the pinchoff of liquid-liquid jets Journal of the Korean Physical Society. 55: 1451-1460. DOI: 10.3938/Jkps.55.1451 |
0.32 |
|
| 2009 |
Choi JW, Lee HG, Jeong D, Kim J. An unconditionally gradient stable numerical method for solving the Allen-Cahn equation Physica a-Statistical Mechanics and Its Applications. 388: 1791-1803. DOI: 10.1016/J.Physa.2009.01.026 |
0.487 |
|
| 2009 |
Kim J. A generalized continuous surface tension force formulation for phase-field models for multi-component immiscible fluid flows Computer Methods in Applied Mechanics and Engineering. 198: 3105-3112. DOI: 10.1016/J.Cma.2009.05.008 |
0.386 |
|
| 2009 |
Kim J, Kang K. A numerical method for the ternary Cahn--Hilliard system with a degenerate mobility Applied Numerical Mathematics. 59: 1029-1042. DOI: 10.1016/J.Apnum.2008.04.004 |
0.482 |
|
| 2008 |
Kim J, Bae HO. An Unconditionally Gradient Stable Adaptive Mesh Refinement for the Cahn-Hilliard Equation Journal of the Korean Physical Society. 53: 672-679. DOI: 10.3938/Jkps.53.672 |
0.427 |
|
| 2008 |
Lee HG, Kim J. A second-order accurate non-linear difference scheme for the N -component Cahn–Hilliard system Physica a-Statistical Mechanics and Its Applications. 387: 4787-4799. DOI: 10.1016/J.Physa.2008.03.023 |
0.432 |
|
| 2007 |
Kim J. Three-Dimensional Numerical Simulations Of A Phase-Field Model For Anisotropic Interfacial Energy Communications of the Korean Mathematical Society. 22: 453-464. DOI: 10.4134/Ckms.2007.22.3.453 |
0.443 |
|
| 2007 |
Wise S, Kim J, Lowengrub J. Solving the regularized, strongly anisotropic Cahn–Hilliard equation by an adaptive nonlinear multigrid method Journal of Computational Physics. 226: 414-446. DOI: 10.1016/J.Jcp.2007.04.020 |
0.655 |
|
| 2007 |
Kim J. A numerical method for the Cahn–Hilliard equation with a variable mobility Communications in Nonlinear Science and Numerical Simulation. 12: 1560-1571. DOI: 10.1016/J.Cnsns.2006.02.010 |
0.507 |
|
| 2007 |
Kim J. Phase field computations for ternary fluid flows Computer Methods in Applied Mechanics and Engineering. 196: 4779-4788. DOI: 10.1016/J.Cma.2007.06.016 |
0.393 |
|
| 2006 |
Kim J. Numerical simulations of phase separation dynamics in a water-oil-surfactant system. Journal of Colloid and Interface Science. 303: 272-9. PMID 16890235 DOI: 10.1016/J.Jcis.2006.07.032 |
0.483 |
|
| 2006 |
Dunn JC, Chan WY, Cristini V, Kim JS, Lowengrub J, Singh S, Wu BM. Analysis of cell growth in three-dimensional scaffolds. Tissue Engineering. 12: 705-16. PMID 16674285 DOI: 10.1089/Ten.2006.12.705 |
0.524 |
|
| 2005 |
Kim J, Lowengrub J. Phase field modeling and simulation of three-phase flows Interfaces and Free Boundaries. 7: 435-466. DOI: 10.4171/Ifb/132 |
0.555 |
|
| 2005 |
Kim J. An Augmented Projection Method For The Incompressible Navier-Stokes Equations In Arbitrary Domains International Journal of Computational Methods. 2: 201-212. DOI: 10.1142/S0219876205000442 |
0.446 |
|
| 2005 |
Kim J. A continuous surface tension force formulation for diffuse-interface models Journal of Computational Physics. 204: 784-804. DOI: 10.1016/J.Jcp.2004.10.032 |
0.436 |
|
| 2005 |
Kim J. A diffuse-interface model for axisymmetric immiscible two-phase flow Applied Mathematics and Computation. 160: 589-606. DOI: 10.1016/J.Amc.2003.11.020 |
0.468 |
|
| 2004 |
Kang K, Kim J, Lowengrub J. Conservative multigrid methods for ternary Cahn-Hilliard systems Communications in Mathematical Sciences. 2: 53-77. DOI: 10.4310/Cms.2004.V2.N1.A4 |
0.62 |
|
| 2004 |
Wise SM, Lowengrub JS, Kim JS, Johnson WC. Efficient phase-field simulation of quantum dot formation in a strained heteroepitaxial film Superlattices and Microstructures. 36: 293-304. DOI: 10.1016/J.Spmi.2004.08.029 |
0.592 |
|
| 2004 |
Kim J, Kang K, Lowengrub J. Conservative multigrid methods for Cahn–Hilliard fluids Journal of Computational Physics. 193: 511-543. DOI: 10.1016/J.Jcp.2003.07.035 |
0.629 |
|
| 2001 |
Kim J. A coupled higher-order nonlinear Schrödinger equation including higher-order bright and dark solitons Etri Journal. 23: 9-15. |
0.302 |
|
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