Вычислительный алгоритм для решения задачи упаковки шаров двух различных типов в трехмерное множество с неевклидовой метрикой
Авторы
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А.Л. Казаков
-
А.А. Лемперт
-
Ч.Т. Та
Ключевые слова:
оптимальная упаковка шаров разных радиусов
вычислительный алгоритм
оптико-геометрический метод
программный комплекс
бильярдное моделирование
Аннотация
Рассматривается задача упаковки шаров двух типов в замкнутое ограниченное множество в трехмерном пространстве как с евклидовой, так и со специальной неевклидовой метрикой. Требуется максимизировать радиус шаров при известном количестве шаров каждого типа и заданном отношении между радиусами. Предложен вычислительный алгоритм, основанный на комбинации метода бильярдного моделирования и оптико-геометрического подхода, базирующегося на фундаментальных физических принципах Ферма и Гюйгенса. Приведены результаты вычислительного эксперимента.
Раздел
Раздел 1. Вычислительные методы и приложения
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