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This article is cited in 5 scientific papers (total in 5 papers)
Characteristics scheme for the transport equation solving on a tetrahedron grid with barycentrical interpolation
E. N. Aristova, G. O. Astafurov Keldysh Institute of Applied Mathematics RAS
Abstract:
In this paper, the interpolation-characteristic method of order of approximation is not less
than a second to solve the transport equation on an unstructured grid of tetrahedra is constructed.
The problem of finding numerical solutions by this method, hereinafter method
of short characteristics, is divided into two subtasks. First, there is a resolution of the individual simplicial cell. It is necessary to specify a set of discrete values, the setting of
which on the litted faces is mathematically sufficient to find all remaining grid values in
the cell. Depending on the location of the cell and the direction of propagation of the radiation
there are three different types of illumination. The interpolation in barycentrically
coordinates of the cell with 14 free coefficients is proposed. The interpolation takes into
account the values of radiation intensity at the nodes, and the average integrated intensity
values for edges and faces without adding new points of stensil. This interpolation ensures
at least the second order of approximation with some additional members of the
third order. The method ensures a conservative redistribution of the outcoming fluxes
over cell's faces. The second subtask associated with the choice of order and resolution of
the cells and can be solved using graph theory. Numerical calculations confirm the order
of convergence is approximately the second.
Keywords:
transport equation, method of short characteristics, interpolation-characteristic
method, second order of approximation, barycentric coordinates.
Received: 11.12.2017
Citation:
E. N. Aristova, G. O. Astafurov, “Characteristics scheme for the transport equation solving on a tetrahedron grid with barycentrical interpolation”, Matem. Mod., 30:9 (2018), 33–50; Math. Models Comput. Simul., 11:3 (2019), 349–359
Linking options:
https://www.mathnet.ru/eng/mm4000 https://www.mathnet.ru/eng/mm/v30/i9/p33
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Abstract page: | 344 | Full-text PDF : | 87 | References: | 29 | First page: | 11 |
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