Presentation | 1999/9/22 On the conditions of teh limit circuit of x^^・=f(x) which is differential equations of n-degree where x=(x_1, x_2,…x_n) : Expansion of Bendixons Theorem with cartan's differential form Kaname Tarui, |
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PDF Download Page | PDF download Page Link |
Abstract(in Japanese) | (See Japanese page) |
Abstract(in English) | As Bendixon's Theorem is case of R^2, 9 generalize it in case of n-dimensions. The result is obtained beyond Cartan's differential form and Stoke's Theorem. |
Keyword(in Japanese) | (See Japanese page) |
Keyword(in English) | Bendixon's Theorem / Cartan's defferential form / Stoke's Theorem |
Paper # | NLP99-93 |
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Committee | NLP |
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Conference Date | 1999/9/22(1days) |
Place (in Japanese) | (See Japanese page) |
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Topics (in Japanese) | (See Japanese page) |
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Paper Information | |
Registration To | Nonlinear Problems (NLP) |
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Language | JPN |
Title (in Japanese) | (See Japanese page) |
Sub Title (in Japanese) | (See Japanese page) |
Title (in English) | On the conditions of teh limit circuit of x^^・=f(x) which is differential equations of n-degree where x=(x_1, x_2,…x_n) : Expansion of Bendixons Theorem with cartan's differential form |
Sub Title (in English) | |
Keyword(1) | Bendixon's Theorem |
Keyword(2) | Cartan's defferential form |
Keyword(3) | Stoke's Theorem |
1st Author's Name | Kaname Tarui |
1st Author's Affiliation | Hiyogo Prefectual Senier Highschool of Nshinomiya-imazu() |
Date | 1999/9/22 |
Paper # | NLP99-93 |
Volume (vol) | vol.99 |
Number (no) | 324 |
Page | pp.pp.- |
#Pages | 6 |
Date of Issue |