Parametrized integral manifolds of singularly perturbed systems in the critical case for problems of chemical kinetics Научная публикация
| Журнал |
Сибирские электронные математические известия (Siberian Electronic Mathematical Reports)
, E-ISSN: 1813-3304 |
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| Вых. Данные | Год: 2019, Том: 16, Страницы: 1640-1653 Страниц : 14 DOI: 10.33048/SEMI.2019.16.115 | ||
| Ключевые слова | Asymptotic expansion; Integral manifold; Singularly perturbed system; Slow motions | ||
| Авторы |
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| Организации |
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Реферат:
A constructive algorithm is proposed for calculating the coefficients of the asymptotic expansion of a slow motions integral manifold represented in parametric form. The existence and uniqueness theorem is proven for a parametrized integral manifold of a singularly perturbed system in a degenerate case. © 2019 Sobolev Institute of Mathematics.
Библиографическая ссылка:
Kononenko L.I.
Parametrized integral manifolds of singularly perturbed systems in the critical case for problems of chemical kinetics
Сибирские электронные математические известия (Siberian Electronic Mathematical Reports). 2019. V.16. P.1640-1653. DOI: 10.33048/SEMI.2019.16.115 WOS Scopus OpenAlex
Parametrized integral manifolds of singularly perturbed systems in the critical case for problems of chemical kinetics
Сибирские электронные математические известия (Siberian Electronic Mathematical Reports). 2019. V.16. P.1640-1653. DOI: 10.33048/SEMI.2019.16.115 WOS Scopus OpenAlex
Идентификаторы БД:
| Web of science: | WOS:000496948800001 |
| Scopus: | 2-s2.0-85083401988 |
| OpenAlex: | W3015593887 |
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