Korteweg-de Vries Flows with General Initial Conditions
Kotani, Shinichi
- 出版商: Springer
- 出版日期: 2024-02-27
- 售價: $5,160
- 貴賓價: 9.5 折 $4,902
- 語言: 英文
- 頁數: 162
- 裝訂: Hardcover - also called cloth, retail trade, or trade
- ISBN: 9819997372
- ISBN-13: 9789819997374
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商品描述
Large numbers of studies of the KdV equation have appeared since the pioneering paper by Gardner, Greene, Kruskal, and Miura in 1967. Most of those works have employed the inverse spectral method for 1D Schrödinger operators or an advanced Fourier analysis. Although algebraic approaches have been discovered by Hirota-Sato and Marchenko independently, those have not been fully investigated and analyzed.
The present book offers a new approach to the study of the KdV equation, which treats decaying initial data and oscillating data in a unified manner. The author's method is to represent the tau functions introduced by Hirota-Sato and developed by Segal-Wilson later in terms of the Weyl-Titchmarsh functions (WT functions, in short) for the underlying Schrödinger operators. The main result is stated by a class of WT functions satisfying some of the asymptotic behavior along a curve approaching the spectrum of the Schrödinger operators at +∞ in an order of -(n-1/2)for the nth KdV equation. This class contains many oscillating potentials (initial data) as well as decaying ones. Especially bounded smooth ergodic potentials are included, and under certain conditions on the potentials, the associated Schrödinger operators have dense point spectrum. This provides a mathematical foundation for the study of the soliton turbulence problem initiated by Zakharov, which was the author's motivation for extending the class of initial data in this book. A large class of almost periodic potentials is also included in these ergodic potentials. P. Deift has conjectured that any solutions to the KdV equation starting from nearly periodic initial data are almost periodic in time. Therefore, our result yields a foundation for this conjecture.
For the reader's benefit, the author has included here (1) a basic knowledge of direct and inverse spectral problem for 1D Schrödinger operators, including the notion of the WT functions; (2)Sato's Grassmann manifold method revised by Segal-Wilson; and (3) basic results of ergodic Schrödinger operators.
商品描述(中文翻譯)
自1967年Gardner、Greene、Kruskal和Miura的開創性論文以來,關於KdV方程的大量研究已經出現。其中大部分的研究都使用了一維Schrödinger算子的逆譜方法或先進的傅立葉分析。儘管Hirota-Sato和Marchenko分別發現了代數方法,但這些方法尚未得到充分的研究和分析。
本書提供了一種新的研究KdV方程的方法,該方法統一處理了衰減的初始數據和振蕩的數據。作者的方法是將Hirota-Sato引入的tau函數以及Segal-Wilson後來發展的tau函數表示為底層Schrödinger算子的Weyl-Titchmarsh函數(簡稱WT函數)。主要結果是關於WT函數的一類滿足某種漸近行為的曲線,該曲線接近Schrödinger算子在+∞處的譜。對於第n個KdV方程,該類包含許多振蕩的電位(初始數據)以及衰減的電位。特別是包括有界光滑的遞歸電位,並且在電位的某些條件下,相應的Schrödinger算子具有稠密的點譜。這為Zakharov提出的孤立子湍流問題的研究提供了數學基礎,這也是作者擴展本書中初始數據類型的動機。這些遞歸電位中還包括了一大類幾乎周期的電位。P. Deift猜測,從幾乎周期的初始數據開始的KdV方程的任何解在時間上都是幾乎周期的。因此,我們的結果為這個猜測提供了基礎。
為了讀者的便利,作者在這裡包括了以下內容:(1)關於一維Schrödinger算子的直接和逆譜問題的基本知識,包括WT函數的概念;(2)由Segal-Wilson修正的Sato的Grassmann流形方法;以及(3)遞歸Schrödinger算子的基本結果。
作者簡介
作者簡介(中文翻譯)
該作者目前是大阪大學的名譽教授。他曾經在1990年的國際數學家大會上擔任特邀演講者。