Propagation of Perturbations in a Two-Layer Stratified Fluid with an Interface Excited by Moving Sources

被引：3

作者：

Perova, L. V. ^{[1
]}

机构：

[1] Moscow MV Lomonosov State Univ, Fac Phys, Moscow 119992, Russia

来源：

COMPUTATIONAL MATHEMATICS AND MATHEMATICAL PHYSICS | 2008年 / 48卷 / 06期

关键词：

stratified fluid; stream function; internal waves; surface waves; fluid dynamic equation; existence and uniqueness theorems; analytical solution;

D O I：

10.1134/S0965542508060110

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

Propagation of small perturbations in a two-layer inviscid stratified fluid is studied. It is assumed that the higher density fluid occupies the lower unbounded half-space, while the lower density fluid occupies the upper unbounded half-space. The source of the excitation is a plane wave traveling along the interface of the fluids. An explicit analytical solution to the problem is constructed, and its existence and uniqueness are proved. The long-time wave pattern developing in the fluids is analyzed.

引用

页码：1001 / 1023

页数：23

共 10 条

[1]

ALSHIN AB, 2000, COMP MATH MATH PHYS+, V40, P450

[2]

Fedoryuk M. V., 1987, Spravochnaya Matematicheskaya Biblioteka

[3]

Gabov S. A., 1998, NEW PROBLEMS MATH TH

[4]

Gabov S. A., 1990, LINEAR PROBLEMS THEO

[5]

GABOV SA, 1986, PROBLEMS STRATIFIED

[6] Oscillations of a rotating stratified fluid with its free surface excited by moving sources [J].

Perova L.V. .

Computational Mathematics and Mathematical Physics, 2007, 47 (5) :863-881

[7]

PEROVA LV, 2000, COMP MATH MATH PHYS+, V40, P131

[8]

PEROVA LV, 2005, COMP MATH MATH PHYS, V45, P1068

[9]

Pletner Yu. D., 1990, Zhurnal Vychislitel'noi Matematiki i Matematicheskoi Fiziki, V30, P736

[10]

SVESHNIKOV AG, 1991, THEORY FUNCTIONS COM

← 1 →