16. W. Ao, O. Kwon and Y. Lee, Existence of CS-type solutions for Maxwell-Chern-Simons system, preprint.
15. J. Byeon, O. Kwon and J. Seok, Positive vector solutions for 3-coupled nonlinear Schrodinger systems with weak or no self-interactions, preprint.
14. J. Chung and O. Kwon, Global existence for cross-diffusion systems with Fokker-Planck diffusion and saturavle motility, preprint.
13. J. Chung and O. Kwon, Dynamics of Lotka-Volterra competition systems with Fokker-Plank diffusion, submitted.
12. O. Kwon and Y. Lee, Existence of mixed type solutions for non-Abelian Chern-Simons-Higgs vortices with flavor, submitted.
11. J. Chung, Y.-J. Kim, O. Kwon and X. Pan, Discontinuous nonlinearity and finite time extinction, submitted.
10. J. Byeon, O. Kwon and J. Seok, Nonlinear scalar field equations involving the fractional Laplacian, Nonlinearity 30 (2017), no. 4, 1659–1681.
9. J. Chung and O. Kwon, Asymptotic behavior for the viscous Burgers equation with a stationary source, Journal of Mathematical Physics, 57 (2016) 101506.
8. Y.-J. Kim and O. Kwon, Evolution of dispersal with starvation measure and coexistence, Bulletin of Mathematical Biology, 78 (2016), no. 2, 254–279.
7. J. Byeon, O. Kwon and Y. Oshita, Standing wave concentrating on compact manifolds for nonlinear Schr\ddot{o}dinger equations, Communications on Pure and Applied Analysis, 14, 3 (2015), 825-842.
6. Y.-J. Kim, O. Kwon and F. Li, Global asymptotic stability and the ideal free distribution in a starvation driven diffusion, Journal of Mathematical Biology, 68 (2014), 1341-1370.
5. Y.-J. Kim, O. Kwon and F. Li, Evolution of dispersal toward fitness, Bulletin of Mathematical Biology, 75 (2013), 2474-2498.
4. S. Kim, O. Kwon and Y. Lee, Solutions with a prescribed number of zeros for nonlinear Schrodinger systems, Nonlinear analysis: Theory, Methods & Applications, 86 (2013), 74-88.
3. S. Bae and O. Kwon, Nonexistence of positive solutions of nonlinear elliptic systems with potentials vanishing at infinity, Nonlinear analysis: Theory, Methods & Applications, 75, 10 (2012), 4025-4032.
2. O. Kwon, Existence of standing waves of nonlinear Schr\ddot{o}dinger equations with potentials vanishing at infinity, Journal of Mathematical Analysis and Applications, 387, 2 (2012), 920-930.
1. O. Kwon, Existence of multi-bump standing waves with a critical frequency for nonlinear Schr\ddot{o}dinger equations with potentials vanishing at infinity, Proceedings of the Royal society of Edinburgh, 139A (2009), 833-852.