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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 | 2018/07 |
| 形態種別 | 学術雑誌 |
| 査読 | 査読あり |
| 標題 | Rippling rectangular waves for a modified Benney equation |
| 執筆形態 | 共著(筆頭者) |
| 掲載誌名 | Japan Journal of Industrial and Applied Mathematics |
| 掲載区分 | 国内 |
| 巻・号・頁 | 35,939-968頁 |
| 著者・共著者 | Tomoyuki Miyaji, Toshiyuki Ogawa, Ayuki Sekisaka |
| 概要 | ? 2018, The Author(s). One parameter family of rectangular periodic traveling wave solutions are known to exists in a perturbed system of the modified KdV equation. The rectangular periodic traveling wave consists basically of front and back transitions. It turns out that the rectangular traveling wave becomes unstable as its period becomes large. More precisely, torus bifurcation occurs successively along the branch of the rectangular traveling wave solutions. And, as a result, a “rippling rectangular wave” appears. It is roughly the rectangular traveling wave on which small pulse wave trains are superimposed. The bifurcation branch is constructed by a numerical torus continuation method. The instability is explained by using the accumulation of eigenvalues on the essential spectrum around the stationary solutions. Moreover, the critical eigenfunctions which correspond to the torus bifurcation can be characterized theoretically. |
| DOI | 10.1007/s13160-018-0304-1 |
| ISSN | 09167005 |
| PermalinkURL | https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=85046737460&origin=inward |