WANG Lingjun
Associate Professor
Department of Mathematics and Statistics
E-MAIL: wanglingjun@wust.edu.cn
Educational Background
2003--2008, Wuhan University, Pure Mathematics, Doctor.
1999--2003,Jinan University, Mathematics and Applied Mathematics, Bachelor.
Work Experience
2013—Present, Associate professor, Dept. of Mathematics and Statistics, Wuhan University of Science and Technology, China.
2008--2013, Lecturer, Dept. of Mathematics and Statistics, Wuhan University of Science and Technology, China.
Research Field
Main research field is Analysis of PDE, such as existence, stability and regularity of solitary traveling water waves.
Academic Achievements
1 L.-J. Wang. Orbital stability of solitary waves on a ferrofluid jet. Non linear Anal. Real World Appl., 69:Paper No. 103721, 39, 2023.
2 L.-J. Wang. Analyticity of rotational traveling capillary-gravity waves with critical layers. Nonlinear Anal., 227:Paper No. 113164, 18, 2023.
3 J. Chu and L.-J. Wang. Analyticity of rotational traveling gravity two- layer waves. Stud. Appl. Math., 146(3):605–634, 2021.
4 J. Chu, X. Wang, L.-J. Wang, and Z. Zhang. A flow force reformulation of steady periodic fixed-depth irrotational equatorial flows. J. Differential Equations, 292:220–246, 2021.
5 L. Wang and Q. Wang. Small-amplitude solitary interfacial traveling waves in a gravity-capillary two-layered fluid with vorticity. Acta Math. Sci. Ser. A (Chinese Ed.), 40(4):947–976, 2020.
6 L.-J. Wang. Small-amplitude solitary and generalized solitary traveling waves in a gravity two-layer fluid with vorticity. Nonlinear Anal., 150:159–193, 2017.
7 L.-J. Wang. Well-posedness for the Cahn-Hilliard equation with Neumann boundary condition on the half space. J. Partial Differ. Equ., 30(4):344–380, 2017.
8 L.-J. Wang. Particle paths in small amplitude solitary waves with neg- ative vorticity. J. Math. Anal. Appl., 398(1):211–220, 2013.
9 L.-J. Wang. Regularity of traveling periodic stratified water waves with vorticity. Nonlinear Anal., 81:247–263, 2013.
10 H. Chen, W.-X. Li, and L.-J. Wang. Regularity of traveling free surface water waves with vorticity. J. Nonlinear Sci., 23(6):1111–1142, 2013.
11 L.-J. Wang. The dynamics of small amplitude solutions of the Swift- Hohenberg equation on a large interval. Commun. Pure Appl. Anal., 11(3):1129–1156, 2012.
12 H. Chen and L.-J. Wang. A perturbation approach for the transverse spectral stability of small periodic traveling waves of the ZK equation. Kinet. Relat. Models, 5(2):261–281, 2012.
13 L.-J. Wang. Homoclinic and heteroclinic orbits for the 02 or 02i! sin- gularity in the presence of two reversibility symmetries. Quart. Appl. Math., 67(1):1–38, 2009.
