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オガワ トシユキ
OGAWA Toshiyuki
小川 知之 所属 明治大学 総合数理学部 職種 専任教授 |
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| 言語種別 | 日本語 |
| 発行・発表の年月 | 2006/06 |
| 形態種別 | 学術雑誌 |
| 査読 | 査読あり |
| 標題 | Bifurcation analysis to Rayleigh-b?nard convection in finite box with up-down symmetry |
| 執筆形態 | 単著 |
| 掲載誌名 | Communications on Pure and Applied Analysis |
| 掲載区分 | 国外 |
| 巻・号・頁 | 5,383-393頁 |
| 著者・共著者 | Toshiyuki Ogawa |
| 概要 | Rayleigh-Benard convection in a small rectangular domain is studied by the standard bifurcation analysis. The dynamics on the center manifold is calculated up to 3rd order. By this normal form, it is possible to determine the local bifurcation structures in principle. One can easily imagine that mixed mode solutions such as hexagonal, patchwork-quilt patterns are unstable from the knowledge of amplitude equation:Ginzburg-Landau equation. However they are not necessarily similar to each other in a small rectangular domain. Several non-trivial stable mixed mode patterns are introduced. |
| DOI | 10.3934/cpaa.2006.5.383 |
| ISSN | 15340392 |
| PermalinkURL | https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=33646350535&origin=inward |