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Nonlinear physics and mechanics
Direct Numerical Simulation of Aerodynamic Flows
Based on Integration of the Navier – Stokes Equations
A. M. Lipanova, S. A. Karskanovb a Keldysh Institute of Applied Mathematics,
Miusskaya pl. 4, Moscow, 125047 Russia
b Udmurt Federal Research Center UB RAS,
ul. T. Baramzinoi 34, Izhevsk, 426067 Russia
Аннотация:
The results of the theoretical solution of aerodynamic problems based on direct numerical simulation by integrating the Navier – Stokes equations without involving additional models
and empirical constants are shown. Modern approaches to the theoretical study of high-speed
flows are determined. The advantages, problems, development trends and scientific directions
of research on various approaches are revealed. The advantages and disadvantages of the direct numerical simulation are analyzed. The velocity vectors of laminar and transient flows in
a rectangular channel with a sudden expansion at the inlet are presented in different planes. The
convergence of the method is studied when the computational domain is quantized in space. It
is discovered that fast relaminarization is characteristic of transitional flows. A mathematical
model for calculating bottom drag is presented. The numerical results are compared with the
data of physical experiments and the results of other methods. It is shown that the results of
simulation based on DNS are not inferior in accuracy to RANS and LES results. The results
of a parametric study of a transonic flow around a profile are presented. The high-speed buffet
onset is investigated. The distribution surfaces of the velocity pulsation energy generation are
shown. The frequency of self-oscillations is determined on the basis of spectral analysis.
Ключевые слова:
direct numerical simulation, Navier – Stokes equations, transient flows, base drag,
baffet onset.
Поступила в редакцию: 18.04.2022 Принята в печать: 12.07.2022
Образец цитирования:
A. M. Lipanov, S. A. Karskanov, “Direct Numerical Simulation of Aerodynamic Flows
Based on Integration of the Navier – Stokes Equations”, Rus. J. Nonlin. Dyn., 18:3 (2022), 349–365
Образцы ссылок на эту страницу:
https://www.mathnet.ru/rus/nd798 https://www.mathnet.ru/rus/nd/v18/i3/p349
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