P. P. Matus, B. D. Utebaev, “Monotone schemes of conditional approximation and arbitrary order of accuracy for the transport equation”, Zh. Vychisl. Mat. Mat. Fiz., 62:3 (2022), 367–380; Comput. Math. Math. Phys., 62:2 (2022), 359

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Zhurnal Vychislitel'noi Matematiki i Matematicheskoi Fiziki, 2022, Volume 62, Number 3, Pages 367–380
DOI: https://doi.org/10.31857/S0044466922030103 (Mi zvmmf11367)

General numerical methods

Monotone schemes of conditional approximation and arbitrary order of accuracy for the transport equation

P. P. Matus^a, B. D. Utebaev^b

^a John Paul II Catholic University of Lublin, 20-950, Lublin, Poland
^b Institute of Mathematics, National Academy of Sciences of Belarus, 220030, Minsk, Belarus

DOI: https://doi.org/10.31857/S0044466922030103

Abstract: An initial-boundary value problem for the one-dimensional transport equation with a constant coefficient $a>0$ is approximated by a usual explicit explicit monotone difference scheme of traveling calculation “upwind scheme”. Under a Courant-type condition, it is proved that the scheme has an arbitrary $k$th order of accuracy for smooth solutions. Assuming the existence of weakly discontinuous solutions, the results are generalized to multidimensional equations. Monotone finite difference schemes for equations with variable coefficients and for first-order semilinear hyperbolic equations are constructed with the use of a special Steklov averaging with respect to nonlinearity. The efficiency of the considered methods is illustrated by numerical results.

Key words: monotone scheme, exact difference scheme, schemes of arbitrary order, Steklov averaging, conditional approximation.

Received: 11.03.2021
Revised: 23.08.2021
Accepted: 17.11.2021

English version:
Computational Mathematics and Mathematical Physics, 2022, Volume 62, Issue 2, Pages 359–371
DOI: https://doi.org/10.1134/S0965542522030101

Bibliographic databases:

Document Type: Article

UDC: 519.63

Language: Russian

Citation: P. P. Matus, B. D. Utebaev, “Monotone schemes of conditional approximation and arbitrary order of accuracy for the transport equation”, Zh. Vychisl. Mat. Mat. Fiz., 62:3 (2022), 367–380; Comput. Math. Math. Phys., 62:2 (2022), 359–371

Citation in format AMSBIB

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