Исследование свойств разностной схемы для реализации этапа адвекции метода решеточных уравнений Больцмана
Авторы
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Г.В. Кривовичев
-
Е.С. Марнопольская
Ключевые слова:
метод решеточных уравнений Больцмана
расщепление по физическим процессам
уравнение переноса
устойчивость по начальным условиям
метод Неймана
Аннотация
Исследуется конечно-разностная однопараметрическая схема для решения системы уравнений переноса, возникающей при применении метода расщепления по физическим процессам к задачам для системы кинетических уравнений. Исследование устойчивости проводится с помощью метода Неймана, построена область устойчивости на плоскости «параметр схемы-число Куранта». Показано, что за счет выбора параметра можно влиять на дисперсионные и диссипативные свойства схемы. Реализован подход к выбору оптимального параметра, основанный на оптимизации дисперсионных и диссипативных поверхностей. Эффективность схемы при оптимальном значении параметра показана при численном решении задач о течении в каверне и о волнах сдвига в вязкой жидкости.
Раздел
Раздел 1. Вычислительные методы и приложения
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