Отрывок: However during a chemical process perturbations are possible. These perturbations can lead to the thermal explosion when the perturbed trajectory deviates from the canard. To solve this problem it is possible to glue the stable and unstable slow integral manifolds at all points ...
Полная запись метаданных
Поле DC | Значение | Язык |
---|---|---|
dc.contributor.author | Shchepakina, E. A. | - |
dc.date.accessioned | 2018-08-10 10:26:27 | - |
dc.date.available | 2018-08-10 10:26:27 | - |
dc.date.issued | 2018 | - |
dc.identifier | Dspace\SGAU\20180809\71325 | ru |
dc.identifier.citation | Shchepakina E.A. A Geometric Approach to the Modeling of Critical Phenomena in Combustion Models / E.A. Shchepakina // International Conference on Combustion Physics and Chemistry // (Samara, Russia, 24-28 July): proceeding of the conference / Samara University; Edited by A.M. Mebel and V.N. Azyazov – Samara: Publishing OOO “Insoma-Press”, 2018 – p. 65 | ru |
dc.identifier.isbn | 978-5-4317-0298-3 | - |
dc.identifier.uri | http://repo.ssau.ru/handle/International-Conference-on-Combustion-Physics-and-Chemistry/A-Geometric-Approach-to-the-Modeling-of-Critical-Phenomena-in-Combustion-Models-71325 | - |
dc.language.iso | en | ru |
dc.publisher | Publishing OOO “Insoma-Press” | ru |
dc.title | A Geometric Approach to the Modeling of Critical Phenomena in Combustion Models | ru |
dc.type | Thesis | ru |
dc.textpart | However during a chemical process perturbations are possible. These perturbations can lead to the thermal explosion when the perturbed trajectory deviates from the canard. To solve this problem it is possible to glue the stable and unstable slow integral manifolds at all points ... | - |
Располагается в коллекциях: | International Conference on Combustion Physics and Chemistry |
Файлы этого ресурса:
Файл | Описание | Размер | Формат | |
---|---|---|---|---|
65.pdf | 51.09 kB | Adobe PDF | Просмотреть/Открыть |
Показать базовое описание ресурса
Просмотр статистики
Поделиться:
Все ресурсы в архиве электронных ресурсов защищены авторским правом, все права сохранены.