On steady periodic waves on the surface of a fluid of finite depth

被引:0
作者
T. A. Bodnar’
机构
[1] Altai State Technical University,Technological Institute
来源
Journal of Applied Mechanics and Technical Physics | 2011年 / 52卷
关键词
integral equation; nonlinear operator; bifurcations point; stream function; complex potential;
D O I
暂无
中图分类号
学科分类号
摘要
A solution of Nekrasov’s integral equation is obtained, and the range of its existence in the theory of steady nonlinear waves on the surface of a finite-depth fluid is determined. Relations are derived for calculating the wave profile and propagation velocity as functions of the ratio of the liquid depth to the wavelength. A comparison is made of the velocities obtained using the linear and nonlinear theories of wave propagation.
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页码:378 / 384
页数:6
相关论文
共 3 条
[1]  
Bodnar’ T. A.(2007)One approximate solution of the Nekrasov problem J. Appl. Mech. Tech. Phys. 48 818-823
[2]  
Maklakov D. V.(2002)Almost-highest gravity waves on water of finite depth Eur. J. Appl. Math. 13 67-93
[3]  
Karabut E. A.(2009)Exact solution of a nonlinear boundary-value problem in the theory of waves on a finite-depth fluid Prikl. Mat. Mekh. 73 741-762
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