Тип публикации: доклад, тезисы доклада, статья из сборника материалов конференций
Конференция: International Conference on Numerical Analysis and Applications (NAA); Lozenetz, BULGARIA; Lozenetz, BULGARIA
Год издания: 2017
Идентификатор DOI: 10.1007/978-3-319-57099-0_35
Ключевые слова: Semi-lagrangian approach, Advection equation, Hyperbolic conservation law, Advection, Boundary value problems, Initial value problems, Numerical analysis, Physical properties, Advection equations, Approximate solution, Hyperbolic conservation laws, Initial-boundary value problems, Integral balance equation, Numerical experiments, Semi-Lagrangian, Semi-Lagrangian methods, Lagrange multipliers
Аннотация: In the paper, a new discrete analogue of an initial-boundary value problem is presented for the two-dimensional advection equation arising from a scalar time-dependent hyperbolic conservation law. At each time level, an approximate solution is found as a
Журнал: NUMERICAL ANALYSIS AND ITS APPLICATIONS (NAA 2016)
Выпуск журнала: Vol. 10187
Номера страниц: 325-333
ISSN журнала: 03029743
Место издания: CHAM
Издатель: SPRINGER INTERNATIONAL PUBLISHING AG