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<図書>
Coexistence and persistence of strange attractors
| 責任表示 | Antonio Pumariño, J. Angel Rodríguez |
|---|---|
| シリーズ | Lecture notes in mathematics ; 1658 . Instituto de matemática Pura e Aplicada, Rio de Janeiro, Brasil / adviser, C. Camacho ; v. 49 |
| データ種別 | 図書 |
| 出版情報 | Berlin : Springer , c1997 |
| 本文言語 | 英語 |
| 大きさ | viii, 194 p. : ill. ; 24 cm |
| 概要 | Although chaotic behaviour had often been observed numerically earlier, the first mathematical proof of the existence, with positive probability (persistence) of strange attractors was given by Bened...cks and Carleson for the Henon family, at the beginning of 1990's. Later, Mora and Viana demonstrated that a strange attractor is also persistent in generic one-parameter families of diffeomorphims on a surface which unfolds homoclinic tangency. This book is about the persistence of any number of strange attractors in saddle-focus connections. The coexistence and persistence of any number of strange attractors in a simple three-dimensional scenario are proved, as well as the fact that infinitely many of them exist simultaneously. 続きを見る |
| 電子版へのリンク | https://hdl.handle.net/2324/7006936 |
所蔵情報
| 状態 | 巻次 | 所蔵場所 | 請求記号 | 刷年 | 文庫名称 | 資料番号 | コメント | 予約・取寄 | 複写申込 | 自動書庫 |
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理系図3F 数理独自 | SER/LNM/1658 | 1997 |
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023211997007050 |
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理系図 自動書庫 | 410.8/L 493/(1658) | 1997 |
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054211997001853 |
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数理 雑誌室 | SER/LNM/K1658 | 1997 |
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027232003290317 |
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書誌詳細
| 一般注記 | Includes bibliography (p. [193]-194) and index |
|---|---|
| 著者標目 | *Pumariño, Antonio, 1966- Rodriguez, Jose A., 1955- |
| 件 名 | LCSH:Chaotic behavior in systems |
| 分 類 | LCC:QA3 LCC:Q172.5.C45 DC21:510 s DC21:814/.74 NDC8:410.8 NDC8:415.5 |
| 書誌ID | 1000925666 |
| ISBN | 3540627316 |
| NCID | BA3093951X |
| 巻冊次 | ISBN:3540627316 |
| 登録日 | 2009.09.16 |
| 更新日 | 2017.02.18 |