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This article is cited in 2 scientific papers (total in 2 papers)
Numerical simulation of acoustic waves propagation in an atmosphere-forestland-ground system
G. M. Voskoboinikovaa, D. A. Karavaeva, M. S. Khairetdinovab a Institute of Computational Mathematics and Mathematical Geophysics SB RAS, pr. Akad. Lavrentyeva, 630090 Novosibirsk
b Novosibirsk State Technical University,
pr. K. Marksa 20,
630073 Novosibirsk
Abstract:
Under study is the problem of numerical simulation of acoustic waves propagation in a two-dimensional inhomogeneous medium represented by the atmosphere-forestland-ground model. A specific feature of the simulation is the introduction into the basic equations of acoustics of a linear damping function that characterizes the energy loss of the acoustic wave with respect to afforestation. The problem is considered of interaction between the acoustic waves incident at a given angle from the atmosphere to the forestland-ground boundary and the seismic waves arising in the ground. The issue of the forestland influence on the levels of acoustic and seismic waves is investigated. In particular, the impact of the friction coefficient on the attenuation rate of acoustic oscillations in the forestland is estimated. The algorithm and software are developed and implemented for calculating the acoustic pressure levels in various media, by using the wave equation for the atmosphere, Euler's gas dynamics equations for the forestland, and the elasticity equation for the ground. The results of numerical experiments are presented as instantaneous images of the wave field.
Keywords:
technogenic noise, infrasonic wave, geoecological danger, noise absorption, forestland, numerical experiment, equations of gas dynamics, numerical result.
Received: 21.09.2018 Revised: 29.10.2018 Accepted: 15.12.2018
Citation:
G. M. Voskoboinikova, D. A. Karavaev, M. S. Khairetdinov, “Numerical simulation of acoustic waves propagation in an atmosphere-forestland-ground system”, Sib. Zh. Ind. Mat., 22:1 (2019), 24–33; J. Appl. Industr. Math., 13:1 (2019), 175–183
Linking options:
https://www.mathnet.ru/eng/sjim1029 https://www.mathnet.ru/eng/sjim/v22/i1/p24
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Abstract page: | 362 | Full-text PDF : | 366 | References: | 36 | First page: | 11 |
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