教授
刘青青
工作经历(科研与学术工作经历,按时间倒序排序)
2025/09 -至今, 华南理工大学数学学院教授
2019/09 -2025/08, 华南理工大学数学学院副教授
2018/09 -2019/09, 加拿大约克大学访问学者
2017/04 -2019/08, 华南理工大学数学学院讲师
2015/03 -2017/03, 华南理工大学II类博士后
非线性偏微分方程
科研项目:
[1] 广东省自然科学基金-面上项目(2026A1515010740): 2026.01-2028.12,在研
[2] 广州市科技计划项目(202102021137): 2021.04-2023.03,已结题
[3] 广东省自然科学基金-面上项目(2021A1515012360): 2021.01-2023.12,已结题
[4] 国家自然科学基金-面上项目(12071153): 2021.01-2024.12,已结题
[5] 国家自然科学基金-青年基金项目(11501217):2016.01-2018.12,已结题
[6] 广东省自然科学基金博士启动基金项目(2016A030310416):2016.06-2019.06,已结题
[7] 中国博士后科学基金-第九批特别资助项目(2016T90775):2015.3-2016.9,已结题
[8] 中国博士后科学基金-面上项目(2015M580714):2015.11-2017.03,已结题
发表论文:
[1] Huang Yifeng, Liu Qingqing, Zhu Changjiang*, Global strong solutions of the 3D compressible
viscoelastic equations without structure assumptions, J. Differential Equations, 450(2026), Paper No. 113767, 21 pp.
[2]Fu Wenwen, Liu Qingqing*, Stability of planar stationary solution foroutflow problem on the viscous vasculogenesis model, Nonlinear Anal. Real World Appl.,88(2026), Paper No. 104459, 27 pp.
[3]Chen Senming, Liu Qingqing*, Global solutions to a viscous vasculogenesis modelin one-dimension space, Z. Angew. Math. Phys., 76(2025),no. 2, Paper No. 79, 26 pp.
[4]Liu Qingqing*, Yan Qian, Asymptoticstability of rarefaction wave and boundary layer for outflow problem on theviscous vasculogenesis model, Nonlinearity, 37(2024), no. 8, Paper No. 085011, 43 pp.
[5]Liu Qingqing, Peng Hongyun, Wang Zhi-An*, The relaxation limit of a quasi-linearhyperbolic-parabolic chemotaxis system modeling vasculogenesis, Commun. Math. Anal. Appl., 3(2024), no. 1, 1--18.
[6]Liu Qingqing*, Tian Yuxiu,Stability of planar rarefaction wave for viscous vasculogenesis model, Commun.Math. Sci., 21 (2023), no. 8, 2261--2299.
[7]Liu Qingqing*, Wu Xiaoli, Stability of rarefaction wave for viscous vasculogenesismodel, Discrete Contin. Dyn. Syst. Ser. B,27 (2022), no. 12, 7089--7108.
[8]Liu Qingqing, Peng Hongyun, Wang Zhi-An*, Asymptotic stability of diffusionwaves of a quasi-linear hyperbolic-parabolic model for vasculogenesis, SIAM J. Math.Anal., 54(2022), no. 1, 1313--1346.
[9]Liu Qingqing, Peng Hongyun, Wang Zhi-An*,Convergence tononlinear diffusion waves for a hyperbolic-parabolic chemotaxis systemmodelling vasculogenesis,J. DifferentialEquations, 314 (2022), 251--286.
[10]Liu Qingqing*, Zhang Peixin,Long-time behavior of solution to the compressible micropolar fluids withexternal force, Nonlinear Anal. Real World Appl., 40 (2018), 361--376.
[11]Liu Qingqing*, Su Yifan, Largetime behaviour of the non-isentropic Navier-Stokes-Maxwell system, Math. MethodsAppl. Sci., 40 (2017), no. 3, 663--679.
[12]Liu Qingqing*, Yin Haiyan,Stability of contact discontinuity for 1-D compressible viscous micropolarfluid model, Nonlinear Anal., 149 (2017), 41--55.
[13]Liu Qingqing*, Zhang Peixin, Optimal time decay of thecompressible micropolar fluids, J. Differential Equations, 260 (2016), no. 10, 7634--7661.
[14]DuanRenjun*, Liu Qingqing, Zhu Changjiang, Darcy’s law and diffusion for a two-fluid Euler–Maxwell system withdissipation, Math. Models Methods Appl. Sci., 25(11) (2015), 2089--2151.
[15]Liu Qingqing, Zhu Changjiang*, Asymptotic stability of stationarysolutions to the compressible Euler-Maxwell equations, IndianaUniv. Math. J., 62(2013), no. 4, 1203--1235.
[16]Liu Qingqing, Yin Haiyan, ZhuChangjiang*, Asymptotic stability ofthe compressible Euler-Maxwell equations to Euler-Poisson equations, IndianaUniv. Math. J., 63(2014), no. 4, 1085--1108.
[17]Evje Steinar, Liu Qingqing, Zhu Changjiang*, Asymptotic stability of thecompressible gas-liquid model with well-formation interaction and gravity, J.Differential Equations, 257(2014), 3226--3271.
[18]Liu Qingqing, Zhu Changjiang*, Asymptotic behavior of a viscousliquid-gas model with mass-dependent viscosity and vacuum, J. Differential Equations, 252(2012),2492--2519.
[19]Fan Long, Liu Qingqing, Zhu Changjiang*, Convergence rates to stationarysolutions of a gas--liquid model with external forces, Nonlinearity,25(2012),2875--2901.
maqqliu@scut.edu.cn
4号楼4232A