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Article information
1999 , Volume 4, ¹ 3, p.95-105
Litvinenko A.A., Khabakhpashev G.A.
Numerical modeling of sufficiently long nonlinear two-dimensional waves on water surface in a basin with a gently sloping bottom
The work is devoted to the numerical implementation of a nonlinear evolutionary equation for three-dimensional perturbations of the free surface of not very deep layers of the incompressible viscous fluid. The calculations are shown adequately to describe the processes under study. In particular, the obtained results are in good agreement with the experimental data about the plane wave run-up on a gentle slope.
[full text] Classificator Msc2000:- *76D33 Waves
- 76M20 Finite difference methods
Keywords: evolutionary equation, two-dimensional perturbations
Author(s):
Litvinenko A.A.
Office: Institute of Thermophysics of SB RAS
Address: 630090, Russia, Novosibirsk, Lavrentiev Ave. 1
Khabakhpashev Georgy Alekseevich
Dr. , Associate Professor
Position: Leading research officer
Office: Institute of Thermophysics SB RAS, Novosibirsk State University
Address: 630090, Russia, Novosibirsk, Lavrentiev ave., 1
Phone Office: (383) 316-50-35
E-mail: theory@itp.nsc.ru
Bibliography link:
Litvinenko A.A., Khabakhpashev G.A. Numerical modeling of sufficiently long nonlinear two-dimensional waves on water surface in a basin with a gently sloping bottom // Computational technologies. 1999. V. 4. ¹ 3. P. 95-105
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