TRAVELLING BREAKING WAVES
ДВИЖУЩИЕСЯ РАЗБИВАЮЩИЕСЯ ВОЛНЫ
Koshkarbayev N.M.
May 2023South Ural State University
Bulletin of the South Ural State University, Series: Mathematical Modelling, Programming and Computer Software
2023#16Issue 249 - 58 pp.
We study a mathematical model of coastal waves in the shallow water approximation. The model contains two empirical parameters. The first one controls turbulent dissipation. The second one is responsible for the turbulent viscosity and is determined by the turbulent Reynolds number. We study travelling waves solutions to this model. The existence of an analytical and numerical solution to the problem in the form of a traveling wave is shown. The singular points of the system are described. It is shown that there exists a critical value of the Reylnols number corresponding to the transition from a monotonic profile to an oscillatory one. The paper is organized as follows. First, we present the governing system of ordinary differential equations (ODE) for travelling waves. Second, the Lyapunov function for the corresponding ODE system is derived. Finally, the behavior of the solution to the ODE system is discussed.
Lyapunov function , Reynolds number , shallow-water equation , travelling wave solution
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Institute of Mathematics and Mathematical Modeling, Almaty, Kazakhstan
Al-Farabi Kazakh National University, Almaty, Kazakhstan
Institute of Mathematics and Mathematical Modeling
Al-Farabi Kazakh National University
10 лет помогаем публиковать статьи Международный издатель
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