Nearly Integrable Infinite Dimensional Dynamical System

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Title: Nearly Integrable Infinite Dimensional Dynamical System
Description: This book addresses complex issues such as the existence of homoclinic orbits and the study of chaotic behavior arising from these orbits in various perturbed nonlinear equations, including the Schrödinger equation, the Sine-Gordon equation, and the Korteweg-de Vries (KdV) equation. It provides a detailed and rigorous examination of these topics, supported by rich documentation and illustrative examples. The content reflects fundamental concepts and significant advancements in nearly integrable dynamical systems. Designed to facilitate the rapid entry of senior university students, graduate students, postdoctoral fellows, and early-career academics into the field, this book also serves as a valuable reference for researchers and educators in traditional natural sciences and engineering, aiding in the expansion of their knowledge base.
Authors: Boling GUO, Jun Zhang, Jing Li, Lan Zeng
Resource Type: eBook.
Subjects: Differentiable dynamical systems
Categories: MATHEMATICS / Complex Analysis
Database: eBook Collection (EBSCOhost)
FullText Links:
  – Type: ebook-pdf
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  Availability: 0
Header DbId: nlebk
DbLabel: eBook Collection (EBSCOhost)
An: 3981753
RelevancyScore: 1123
AccessLevel: 6
PubType: eBook
PubTypeId: ebook
PreciseRelevancyScore: 1122.83581542969
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Items – Name: Title
  Label: Title
  Group: Ti
  Data: Nearly Integrable Infinite Dimensional Dynamical System
– Name: Abstract
  Label: Description
  Group: Ab
  Data: This book addresses complex issues such as the existence of homoclinic orbits and the study of chaotic behavior arising from these orbits in various perturbed nonlinear equations, including the Schrödinger equation, the Sine-Gordon equation, and the Korteweg-de Vries (KdV) equation. It provides a detailed and rigorous examination of these topics, supported by rich documentation and illustrative examples. The content reflects fundamental concepts and significant advancements in nearly integrable dynamical systems. Designed to facilitate the rapid entry of senior university students, graduate students, postdoctoral fellows, and early-career academics into the field, this book also serves as a valuable reference for researchers and educators in traditional natural sciences and engineering, aiding in the expansion of their knowledge base.
– Name: Author
  Label: Authors
  Group: Au
  Data: <searchLink fieldCode="AR" term="%22Boling+GUO%22">Boling GUO</searchLink><br /><searchLink fieldCode="AR" term="%22Jun+Zhang%22">Jun Zhang</searchLink><br /><searchLink fieldCode="AR" term="%22Jing+Li%22">Jing Li</searchLink><br /><searchLink fieldCode="AR" term="%22Lan+Zeng%22">Lan Zeng</searchLink>
– Name: TypePub
  Label: Resource Type
  Group: TypPub
  Data: eBook.
– Name: Subject
  Label: Subjects
  Group: Su
  Data: <searchLink fieldCode="DE" term="%22Differentiable+dynamical+systems%22">Differentiable dynamical systems</searchLink>
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  Data: <searchLink fieldCode="ZK" term="%22MATHEMATICS+%2F+Complex+Analysis%22">MATHEMATICS / Complex Analysis</searchLink>
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RecordInfo BibRecord:
  BibEntity:
    Classifications:
      – Code: 515.352
        Scheme: ddc
        Type: prePub
    Languages:
      – Code: eng
        Text: English
    Subjects:
      – SubjectFull: Differentiable dynamical systems
        Type: general
    Titles:
      – TitleFull: Nearly Integrable Infinite Dimensional Dynamical System
        Type: main
  BibRelationships:
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      – PersonEntity:
          Name:
            NameFull: Boling GUO
      – PersonEntity:
          Name:
            NameFull: Jun Zhang
      – PersonEntity:
          Name:
            NameFull: Jing Li
      – PersonEntity:
          Name:
            NameFull: Lan Zeng
      – PersonEntity:
          Name:
            NameFull: Boling GUO
      – PersonEntity:
          Name:
            NameFull: Jun Zhang
      – PersonEntity:
          Name:
            NameFull: Jing Li
      – PersonEntity:
          Name:
            NameFull: Lan Zeng
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          Dates:
            – D: 01
              M: 01
              Type: published
              Y: 2024
            – D: 05
              M: 03
              Type: profile
              Y: 2026
          Identifiers:
            – Type: isbn-print
              Value: 9782759836260
            – Type: isbn-electronic
              Value: 9782759836277
          Titles:
            – TitleFull: Nearly Integrable Infinite Dimensional Dynamical System
              Type: main
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