ON THE MODEL PROBLEM ARISING IN THE STUDY OF MOTION OF VISCOUS COMPRESSIBLE AND INCOMPRESSIBLE FLUIDS WITH A FREE INTERFACE

被引:0
作者
Solonnikov, V. A. [1 ]
机构
[1] Steklov Math Inst, St Petersburg Branch, 27 Fontanka, St Petersburg 191023, Russia
来源
ST PETERSBURG MATHEMATICAL JOURNAL | 2019年 / 30卷 / 02期
关键词
compressible and incompressible fluids; free boundary; Sobolev-Slobodetskii spaces;
D O I
10.1090/spmj/1546
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
The model problem under study concerns the evolution of two viscous capillary fluids of different types: compressible and incompressible, contained in a bounded vessel and separated by a free interface. The solution is estimated in the Sobolev-Slobodetskii function spaces; these estimates can be useful for the proof of stability for the rest state.
引用
收藏
页码:347 / 377
页数:31
相关论文
共 26 条
[21]   Classical Solvability of a Model Problem in a Half-Space, Related to the Motion of an Isolated Mass of a Compressible Fluid [J].
I. V. Denisova ;
V. A. Solonnikov .
Journal of Mathematical Sciences, 2003, 115 (6) :2753-2765
[22]   GLOBAL SOLUTION TO 1D MODEL OF A COMPRESSIBLE VISCOUS MICROPOLAR HEAT-CONDUCTING FLUID WITH A FREE BOUNDARY [J].
Nermina MUJAKOVIC ;
Nelida RNJARIC-ZIC .
Acta Mathematica Scientia, 2016, (06) :1541-1576
[23]   GLOBAL SOLUTION TO 1D MODEL OF A COMPRESSIBLE VISCOUS MICROPOLAR HEAT-CONDUCTING FLUID WITH A FREE BOUNDARY [J].
Mujakovic, Nermina ;
Crnjaric-Zic, Nelida .
ACTA MATHEMATICA SCIENTIA, 2016, 36 (06) :1541-1576
[24]   A Free Boundary Problem Arising from a Stochastic Optimal Control Model with Bounded Dividend Rate [J].
Guan, Chonghu ;
Yi, Fahuai .
STOCHASTIC ANALYSIS AND APPLICATIONS, 2014, 32 (05) :742-760
[25]   A free boundary problem arising from a stochastic optimal control model under controllable risk [J].
Guan, Chonghu ;
Yi, Fahuai .
JOURNAL OF DIFFERENTIAL EQUATIONS, 2016, 260 (06) :4845-4870
[26]   A FULLY NONLINEAR FREE BOUNDARY PROBLEM ARISING FROM OPTIMAL DIVIDEND AND RISK CONTROL MODEL [J].
Guan, Chonghu ;
Yi, Fahuai ;
Chen, Xiaoshan .
MATHEMATICAL CONTROL AND RELATED FIELDS, 2019, 9 (03) :425-452
123