Your search keyword '"Primary 35Q30, 35R35, 76N10, Secondary 76E17, 76E19, 76N99"' showing total 3 results

1. The Compressible Viscous Surface-Internal Wave Problem: Local Well-Posedness

Author

Ian Tice, Juhi Jang, and Yanjin Wang

Subjects

Physics, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Primary 35Q30, 35R35, 76N10, Secondary 76E17, 76E19, 76N99, Fluid mechanics, Mechanics, Viscous liquid, 01 natural sciences, Compressible flow, Physics::Fluid Dynamics, 010101 applied mathematics, Surface tension, Computational Mathematics, Mathematics - Analysis of PDEs, Barotropic fluid, FOS: Mathematics, Compressibility, No-slip condition, Free boundary problem, 19999 Mathematical Sciences not elsewhere classified, 0101 mathematics, Analysis, Analysis of PDEs (math.AP)

Abstract

This paper concerns the dynamics of two layers of compressible, barotropic, viscous fluid lying atop one another. The lower fluid is bounded below by a rigid bottom, and the upper fluid is bounded above by a trivial fluid of constant pressure. This is a free boundary problem: the interfaces between the fluids and above the upper fluid are free to move. The fluids are acted on by gravity in the bulk, and at the free interfaces we consider both the case of surface tension and the case of no surface forces. We prove that the problem is locally well-posed. Our method relies on energy methods in Sobolev spaces for a collection of related linear and nonlinear problems., Comment: 60 pages

Published

2016

2. The compressible viscous surface-internal wave problem: nonlinear Rayleigh-Taylor instability

Author

Yanjin Wang, Juhi Jang, and Ian Tice

Subjects

Physics, Mechanical Engineering, 010102 general mathematics, Primary 35Q30, 35R35, 76N10, Secondary 76E17, 76E19, 76N99, Mechanics, Viscous liquid, Internal wave, 01 natural sciences, Instability, 010101 applied mathematics, Surface tension, Physics::Fluid Dynamics, Mathematics (miscellaneous), Mathematics - Analysis of PDEs, Barotropic fluid, Free boundary problem, Compressibility, FOS: Mathematics, 19999 Mathematical Sciences not elsewhere classified, Rayleigh–Taylor instability, 0101 mathematics, Analysis, Analysis of PDEs (math.AP)

Abstract

This paper concerns the dynamics of two layers of compressible, barotropic, viscous fluid lying atop one another. The lower fluid is bounded below by a rigid bottom, and the upper fluid is bounded above by a trivial fluid of constant pressure. This is a free boundary problem: the interfaces between the fluids and above the upper fluid are free to move. The fluids are acted on by gravity in the bulk, and at the free interfaces we consider both the case of surface tension and the case of no surface forces. We are concerned with the Rayleigh-Taylor instability when the upper fluid is heavier than the lower fluid along the equilibrium interface. When the surface tension at the free internal interface is below the critical value, we prove that the problem is nonlinear unstable., Comment: 41 pages

Published

2015

3. The compressible viscous surface-internal wave problem: stability and vanishing surface tension limit

Author

Ian Tice, Juhi Jang, and Yanjin Wang

Subjects

Physics, 010102 general mathematics, Primary 35Q30, 35R35, 76N10, Secondary 76E17, 76E19, 76N99, Statistical and Nonlinear Physics, Mechanics, Viscous liquid, Internal wave, 01 natural sciences, Instability, Compressible flow, 010101 applied mathematics, Surface tension, Physics::Fluid Dynamics, Mathematics - Analysis of PDEs, Barotropic fluid, Free boundary problem, Compressibility, FOS: Mathematics, 19999 Mathematical Sciences not elsewhere classified, 0101 mathematics, Mathematical Physics, Analysis of PDEs (math.AP)

Abstract

This paper concerns the dynamics of two layers of compressible, barotropic, viscous fluid lying atop one another. The lower fluid is bounded below by a rigid bottom, and the upper fluid is bounded above by a trivial fluid of constant pressure. This is a free boundary problem: the interfaces between the fluids and above the upper fluid are free to move. The fluids are acted on by gravity in the bulk, and at the free interfaces we consider both the case of surface tension and the case of no surface forces. We establish a sharp nonlinear global-in-time stability criterion and give the explicit decay rates to the equilibrium. When the upper fluid is heavier than the lower fluid along the equilibrium interface, we characterize the set of surface tension values in which the equilibrium is nonlinearly stable. Remarkably, this set is non-empty, i.e. sufficiently large surface tension can prevent the onset of the Rayleigh-Taylor instability. When the lower fluid is heavier than the upper fluid, we show that the equilibrium is stable for all non-negative surface tensions and we establish the zero surface tension limit., Comment: 59 pages

Published

2015