个人简历:
潜陈印,浙江大学博士,浙江师范大学数学系教授、博士生导师。欢迎勤奋好学,基础扎实、热衷非线性偏微分方程学习和研究的同学报考研究生。
主要学术经历:
2019.7-2019.8 访问北京中国科学院晨兴数学中心
2018.7 访问达姆斯塔特工业大学(德国)数学系
2016.9-2017.8 访问达姆斯塔特工业大学(德国) 数学系
2013.1-2013.2 访问宾夕法尼亚州立大学(美国) 数学系
发表主要论文列表:
[13] Chenyin Qian, He Beibei, Ting Zhang, Global well-posedness for 2D inhomogeneous asymmetric fluids with large initial data, Sci. China Math.
DOI 10.1007/s11425-022-2099-1
[12]Chenyin Qian, Hui Chen, Ting Zhang,Global existence of weak solutions for 3D incompressible inhomogeneous asymmetric fluids. Math. Ann. 386 (2023), no.3-4, 1555–1593.
[11] Hui Chen, Chenyin Qian,Ting Zhang, Serrin-type regularity criteria for the 3D MHD equations via one velocity component and one magnetic component.Calc.Var.Partial Differential Differential Equations 61(2022), no3, Paper No.89,22 pp.
[10] Chenyin Qian, Yue Qu, Global well-posedness for 3D incompressible inhomogeneous asymmetric fluids with density-dependent viscosity. J. Differential Equations, 306 (2022) 333–402.
[9]Aiting Le, Chenyin Qian, Smoothing effect and well-posedness for 2D Boussinesq equations in critical Sobolev space. Discrete Contin. Dyn. Syst. Ser. B 27(2022), no.12,7625-7656.
[8] Chenyin Qian, Ping Zhang, Global well-posedness of 3D incompressible inhomogeneous Navier-Stokes equations. Methods Appl. Anal. 28 (2021) no. 4, 507–546.
[7] Hui Chen, Wenjun Le, Chenyin Qian, Prodi–Serrin condition for 3D Navier–Stokes equations via one directional derivative of velocity, J. Differential Equations, 298(2021) 500-527.
[6] Zifei Shen, Bin Shang, Chenyin Qian, Existence of sign-changing solutions for p(x)-Laplacian Kirchhoff type problem in RN, J.Math.Soc.Japan 73(2021),no.1,161-183
[5] Reinhard Farwig, Chenyin Qian, Ping Zhang, Incompressible inhomogeneous fluids in bounded domains of R3 with bounded density, J. Functional Analysis, 278 (2020) 108394.
[4] Reinhard Farwig, Chenyin Qian, Asymptotic behavior for the quasi-geostrophic equations with fractional dissipation in R2, J. Differential Equations, 266 (2019) 6525–6579.
[3] Chenyin Qian, A generalized regularity criterion for 3D Navier–Stokes equations in terms of one velocity component, J. Differential Equations, 260 (2016) 3477–3494.
[2]Daoyuan Fang, Chun Liu, Chenyin Qian, On partial regularity problem for 3D Boussinesq Equations, J. Differential Equations, 263 (2017) 4156–4221.
[1]Chenyin Qian, On the Global Regularity for the 3D Magnetohydrodynamics Equations Involving Partial Components, J. Math. Fluid Mech., 20 (2018) 117–131.
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