中国科学院 数学与系统科学研究院
调和分析及其应用研究中心
Center for Harmonic Analysis and its Applications, AMSS, CAS
中心简介
研究进展
预 印 本
2019年研究进展
Abidi, Hammadi
;
Zhang, Ping
On the global well-posedness of 3-D Boussinesq system with variable viscosity.
Chin. Ann. Math. Ser. B
40
(2019),
no. 5,
643–688.
Chemin, Jean-Yves
;
Gallagher, Isabelle
;
Zhang, Ping
Some remarks about the possible blow-up for the Navier-Stokes equations.
Comm. Partial Differential Equations
44
(2019),
no. 12,
1387–1405.
Hao
,
Chengchun;
Luo,
Tao
Ill-posedness of free boundary problem of the incompressible ideal MHD
,
Comm. Math. Phys.
, online first, 2019.
Ji, Min
;
Qi, Weiwei
;
Shen, Zhongwei
;
Yi, Yingfei
Existence of periodic probability solutions to Fokker-Planck equations with applications.
J. Funct. Anal.
277
(2019),
no. 11,
108281, 41 pp.
Ji, Min
;
Shen, Zhongwei
;
Yi, Yingfei
Convergence to equilibrium in Fokker-Planck equations.
J. Dynam. Differential Equations
31
(2019),
no. 3,
1591–1615.
Ji, Min
;
Shen, Zhongwei
;
Yi, Yingfei
Quantitative concentration of stationary measures.
Phys. D
399
(2019),
73–85.
Jia, Zong Lin
;
Wang, You De
Local nonautonomous Schr?dinger flows on K?hler manifolds.
Acta Math. Sin. (Engl. Ser.)
35
(2019),
no. 8,
1251–1299.
Jiang, Ruiqi
;
Wang, Youde
;
Yang, Jun
Vortex structures for some geometric flows from pseudo-Euclidean spaces.
Discrete Contin. Dyn. Syst.
39
(2019),
no. 4,
1745–1777.
Li, Tian-Hong
;
Wang, JingHua
;
Wen, HaiRui
Global structure and regularity of solutions to the eikonal equation.
Arch. Ration. Mech. Anal.
232
(2019),
no. 2,
1073–1112.
Liao, Xian
;
Zhang, Ping
Global regularity of 2D density patches for viscous inhomogeneous incompressible flow with general density: low regularity case.
Comm. Pure Appl. Math.
72
(2019),
no. 4,
835–884.
Liao, Xian
;
Zhang, Ping
Global regularity of 2-D density patches for viscous inhomogeneous incompressible flow with general density: high regularity case.
Anal. Theory Appl.
35
(2019),
no. 2,
163–191.
Paicu, Marius
;
Zhang, Ping
Global strong solutions to 3-D Navier-Stokes system with strong dissipation in one direction.
Sci. China Math.
62
(2019),
no. 6,
1175–1204.
Ri, Myong-Hwan
;
Zhang, Ping
Existence of incompressible and immiscible flows in critical function spaces on bounded domains.
J. Math. Fluid Mech.
21
(2019),
no. 4,
Art. 57, 30 pp.
Wu, Jie
;
Zhang, Liqun
Backward uniqueness for general parabolic operators in the whole space.
Calc. Var. Partial Differential Equations
58
(2019),
no. 4,
Art. 155, 19 pp.
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