The research field of Prof. Min is mathematical modelling and numerical analysis for various natural phenomena. In particular, it includes compuational geometry, partial differential equations, and numerical analysis. Among 22 publications, 17 were published in Journal of Computaional Physics and Jouranal of Scientific Computing, which are top 10% journals in the SCI class.
Gradient Explosion Free Algorithm for Training Recurrent Neural NetworksJournal of the Korean Society for Industrial and Applied Mathematics, 2020, v.24 no.4, 331-350
A semi-implicit and unconditionally stable approximation of the surface tension in two-phase fluidsJOURNAL OF COMPUTATIONAL PHYSICS, 2019, v.397, UNSP 108829
AN ENERGY-STABLE AND SECOND-ORDER ACCURATE METHOD FOR SOLVING THE INCOMPRESSIBLE NAVIER-STOKES EQUATIONSJournal of the Korean Society for Industrial and Applied Mathematics, 2019, v.23 no.2, 93~114
AN OPTIMAL CONTROL APPROACH TO CONFORMAL FLATTENING OF TRIANGULATED SURFACESJournal of the Korean Society for Industrial and Applied Mathematics, 2019, v.23 no.4, 351-365
AN OPTIMAL BOOSTING ALGORITHM BASED ON NONLINEAR CONJUGATE GRADIENT METHODJOURNAL OF THE KOREAN SOCIETY FOR INDUSTRIAL AND APPLIED MATHEMATICS, 2018, v.22 no.1, 1~13
An efficient MILU preconditioning for solving the 2D Poisson equation with Neumann boundary conditionJOURNAL OF COMPUTATIONAL PHYSICS, 2018, v.356, 115-126
An energy-stable method for solving the incompressible Navier–Stokes equations with non-slip boundary conditionJournal of Computational Physics, 2018, v.360, 104-119
Comparison of eigenvalue ratios in artificial boundary perturbation and Jacobi preconditioning for solving Poisson equationJournal of Computational Physics, 2017, v.349, 1-10
AN ELEMENTARY PROOF OF THE OPTIMAL RECOVERY OF THE THIN PLATE SPLINE RADIAL BASIS FUNCTIONJournal of the Korean Society for Industrial and Applied Mathematics, 2015, v.19 no.4, 409-416
A REVIEW OF THE SUPRA-CONVERGENCES OF SHORTLEY-WELLER METHOD FOR POISSON EQUATIONJournal of the Korean Society for Industrial and Applied Mathematics, 2014, 제18권 1호, 51-60
CONVERGENCE ANALYSIS ON GIBOU-MIN METHOD FOR THE SCALAR FIELD IN HODGE-HELMHOLTZ DECOMPOSITIONJournal of the Korean Society for Industrial and Applied Mathematics, 2014, 제18권 4호, 305-315