Abstract:
Construction of difference schemes of high approximation orders for hyperbolic problems is still an important problem. For the construction of grid-characteristic methods, difference schemes were earlier analyzed in the space of undetermined coefficients, where the coefficients of high order derivatives in the first differential approximation of the difference scheme were used as the objective function to be minimized. Other reasonable functionals in the space of undetermined coefficients that are linear in the coefficients of the scheme may be used. By solving a linear programming problem, difference schemes meeting various conditions can be chosen. An example of the linear functional related to the approximation properties of the problem is discussed. It is proposed to call it the generalized approximation condition. Based on this condition, a difference scheme of a novel class is built that has no analogs in the literature. The presentation uses the transport equation with a constant coefficient as an example.
Key words:
linear transport equation, difference scheme, hybrid scheme, linear programming problem, complementary slackness conditions, monotonic scheme, Lagrange multipliers.
Citation:
A. I. Lobanov, F. Kh. Mirov, “A hybrid difference scheme under generalized approximation condition in the space of undetermined coefficients”, Zh. Vychisl. Mat. Mat. Fiz., 58:8 (2018), 73–82; Comput. Math. Math. Phys., 58:8 (2018), 1270–1279
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\by A.~I.~Lobanov, F.~Kh.~Mirov
\paper A hybrid difference scheme under generalized approximation condition in the space of undetermined coefficients
\jour Zh. Vychisl. Mat. Mat. Fiz.
\yr 2018
\vol 58
\issue 8
\pages 73--82
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\crossref{https://doi.org/10.31857/S004446690002002-3}
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\transl
\jour Comput. Math. Math. Phys.
\yr 2018
\vol 58
\issue 8
\pages 1270--1279
\crossref{https://doi.org/10.1134/S0965542518080134}
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Linking options:
https://www.mathnet.ru/eng/zvmmf10763
https://www.mathnet.ru/eng/zvmmf/v58/i8/p73
This publication is cited in the following 5 articles:
D. V. Sadin, I. O. Golikov, E. N. Shirokova, “Testing of the hybrid large-particle method using two-dimensional Riemann problems”, St. Petersb. Polytech. Univ. J.-Phys. Math., 14:1 (2021), 58–71
Ilya V. Basharov, Aleksey I. Lobanov, Smart Innovation, Systems and Technologies, 215, Smart Modelling for Engineering Systems, 2021, 151
A. I. Lobanov, F. H. Mirov, “Difference schemes for drain transfer equation based on space of undefined coefficients analysis”, Math. Models Comput. Simul., 13:3 (2021), 395–407
D. V. Sadin, “Analiz dissipativnykh svoistv gibridnogo metoda krupnykh chastits dlya strukturno slozhnykh techenii gaza”, Kompyuternye issledovaniya i modelirovanie, 12:4 (2020), 757–772
A. I. Lobanov, F. Kh. Mirov, “Ispolzovanie raznostnykh skhem dlya uravneniya perenosa so stokom pri modelirovanii energosetei”, Kompyuternye issledovaniya i modelirovanie, 12:5 (2020), 1149–1164
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