| Temporal and spatial decays for the Navier–Stokes equations HO Bae, BJ Jin Proceedings of the Royal Society of Edinburgh Section A: Mathematics 135 (3 …, 2005 | 81 | 2005 |
| Upper and lower bounds of temporal and spatial decays for the Navier–Stokes equations HO Bae, BJ Jin Journal of Differential Equations 209 (2), 365-391, 2005 | 77 | 2005 |
| Time-asymptotic interaction of flocking particles and an incompressible viscous fluid HO Bae, YP Choi, SY Ha, MJ Kang Nonlinearity 25 (4), 1155, 2012 | 69 | 2012 |
| Decay rate for the incompressible flows in half spaces HO Bae, HJ Choe Mathematische Zeitschrift 238 (4), 799-816, 2001 | 60 | 2001 |
| Asymptotic behavior for the Navier–Stokes equations in 2D exterior domains HO Bae, BJ Jin Journal of Functional Analysis 240 (2), 508-529, 2006 | 55 | 2006 |
| Existence, regularity, and decay rate of solutions of non-Newtonian flow HO Bae Journal of mathematical analysis and applications 231 (2), 467-491, 1999 | 55 | 1999 |
| Global existence of strong solution for the Cucker–Smale–Navier–Stokes system HO Bae, YP Choi, SY Ha, MJ Kang Journal of Differential Equations 257 (6), 2225-2255, 2014 | 52 | 2014 |
| Asymptotic flocking dynamics of Cucker-Smale particles immersed in compressible fluids HO Bae, YP Choi, SY Ha, MJ Kang Discrete And Continuous Dynamical Systems 34 (11), 4419-4458, 2014 | 51 | 2014 |
| EXISTENCE OF SOLUTIONS OF THE -NAVIER-STOKES EQUATIONS HO Bae, J Roh Taiwanese Journal of Mathematics 8 (1), 85-102, 2004 | 51 | 2004 |
| Application of flocking mechanism to the modeling of stochastic volatility S Ahn, HO Bae, SY Ha, Y Kim, H Lim Mathematical Models and Methods in Applied Sciences 23 (09), 1603-1628, 2013 | 49 | 2013 |
| Temporal and spatial decay rates of Navier-Stokes solutions in exterior domains HO Bae, BJ Jin Bulletin of the Korean Mathematical Society 44 (3), 547-567, 2007 | 49 | 2007 |
| A regularity criterion for the Navier–Stokes equations HO Bae, HJ Choe Communications in Partial Differential Equations 32 (7), 1173-1187, 2007 | 47 | 2007 |
| Existence of strong mild solution of the Navier-Stokes equations in the half space with nondecaying initial data HO Bae, BJ Jin Journal of the Korean Mathematical Society 49 (1), 113-138, 2012 | 38 | 2012 |
| An unconditionally gradient stable adaptive mesh refinement for the Cahn–Hilliard equation JS Kim, HO Bae J. Korean Phys. Soc 53 (2), 2008 | 34 | 2008 |
| Temporal decays in L1 and L∞ for the Stokes flow HO Bae Journal of Differential Equations 222 (1), 1-20, 2006 | 30 | 2006 |
| Temporal and spatial decays for the Stokes flow HO Bae Journal of Mathematical Fluid Mechanics 10, 503-530, 2008 | 28 | 2008 |
| A mathematical model for volatility flocking with a regime switching mechanism in a stock market HO Bae, SY Ha, Y Kim, SH Lee, H Lim, J Yoo Mathematical Models and Methods in Applied Sciences 25 (07), 1299-1335, 2015 | 27 | 2015 |
| A constrained consensus based optimization algorithm and its application to finance HO Bae, SY Ha, M Kang, H Lim, C Min, J Yoo Applied Mathematics and Computation 416, 126726, 2022 | 20 | 2022 |
| A kinetic description for the herding behavior in financial market HO Bae, SY Cho, J Kim, SB Yun Journal of Statistical Physics 176, 398-424, 2019 | 20 | 2019 |
| Stability for the 3D Navier–Stokes equations with nonzero far field velocity on exterior domains HO Bae, J Roh Journal of Mathematical Fluid Mechanics 14 (1), 117-139, 2012 | 20 | 2012 |
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