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Mathematical Modelling
The Mathematical Modelling of Diffusion and Advection of Radon in Piecewise Anisotropic Layered Media with Inclusions
V. N. Krizsky, A. R. Nafikova Sterlitamak Branch of the Bashkir State University, Sterlitamak, Russian Federation
Abstract:
The use of radon in various areas
of science and technology keeps growing. In the radiation safety
aspect, the interest to radon stems from the need to protect
people from the pathogenic impact of ionization produced by this
element and its decay products. The other part of the problem of
radon has to do with the fact that radon is an indicator of
seismogeodynamic activity in the continental crust. Its study can
contribute substantially to the understanding of fault tectonics
and yield significant information for seismic forecasts. Some
insufficiently studied questions remain related to identifying and
describing the processes and mechanics of radon transfer in
various media, the factors shaping the temporal and spatial
dynamics of the radon field, which is of interest for locating
hydrocarbon deposits. All that together promotes the active
development of methods for modelling mathematically the transfer
of radon and its decay products in various media, including
anisotropic media.
In this article we construct a mathematical model of radon
diffusion in layered anisotropic media with anisotropic
inclusions, which amounts to a parabolic-type boundary value
problem of mathematical physics. We propose a combined method for
solving the problem based on integral transformations, integral
representations, and boundary integral equations.
Keywords:
diffusion-advection of radon; anisotropic media; boundary problem; method of integral transformations and integral representations; Laplace transform.
Received: 26.12.2013
Citation:
V. N. Krizsky, A. R. Nafikova, “The Mathematical Modelling of Diffusion and Advection of Radon in Piecewise Anisotropic Layered Media with Inclusions”, Vestnik YuUrGU. Ser. Mat. Model. Progr., 7:2 (2014), 38–45
Linking options:
https://www.mathnet.ru/eng/vyuru128 https://www.mathnet.ru/eng/vyuru/v7/i2/p38
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Abstract page: | 373 | Full-text PDF : | 128 | References: | 51 |
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