Реферат: Monotonicity conditions for the CABARET scheme approximating a quasilinear scalar conservation law with a convex flux are obtained. It is shown that the monotonicity of the CABARET scheme for Courant numbers r ∈ (0.5,1] does not ensure the complete decay of unstable strong discontinuities. For the CABARET scheme, a difference analogue of an entropy inequality is derived and a method is proposed ensuring the complete decay of unstable strong discontinuities in the difference solution for any Courant number at which the CABARET scheme is stable. Test computations illustrating these properties of the CABARET scheme are presented.

Библиографическая ссылка: Zyuzina N.A. , Ostapenko V.V.
Decay of unstable strong discontinuities in the case of a convex-flux scalar conservation law approximated by the CABARET scheme
Computational Mathematics and Mathematical Physics. 2018. V.58. N6. P.950-966. DOI: 10.1134/S0965542518060155 WOS Scopus РИНЦ OpenAlex

Оригинальная: Зюзина Н.А. , Остапенко В.В.
О распаде неустойчивых сильных разрывов при аппроксимации схемой КАБАРЕ скалярного закона сохранения с выпуклым потоком
Журнал вычислительной математики и математической физики. 2018. Т.58. №6. С.988-1012. DOI: 10.7868/s004446691806011x РИНЦ OpenAlex

Идентификаторы БД:

Web of science:	WOS:000438129700011
Scopus:	2-s2.0-85049665559
РИНЦ:	35734131
OpenAlex:	W2822259254

Цитирование в БД:

БД	Цитирований
Scopus	3
OpenAlex	2
РИНЦ	2
Web of science	2

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