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Introduction to classical integrable systems / Olivier Babelon, Denis Bernard, Michel Talon.

By: Contributor(s): Material type: TextTextSeries: Cambridge monographs on mathematical physicsPublication details: Cambridge ; New York : Cambridge University Press, 2003.Description: 1 online resource (xi, 602 pages)Content type:
  • text
Media type:
  • computer
Carrier type:
  • online resource
ISBN:
  • 0511062044
  • 9780511062049
  • 9780511535024
  • 0511535023
  • 9780511323775
  • 0511323778
Subject(s): Additional physical formats: Print version:: Introduction to classical integrable systems.DDC classification:
  • 531/.163 21
LOC classification:
  • QA845 .B32 2003eb
Other classification:
  • 31.52
  • O175. 2
  • SK 810
  • SK 350
  • PHY 011f
Online resources:
Contents:
Cover; Half-title; Series-title; Title; Copyright; Contents; 1 Introduction; 2 Integrable dynamical systems; 3 Synopsis of integrable systems; 4 Algebraic methods; 5 Analytical methods; 6 The closed Toda chain; 7 The Calogero-Moser model; 8 Isomonodromic deformations; 9 Grassmannian and integrable hierarchies; 10 The KP hierarchy; 11 The KdV hierarchy; 12 The Toda field theories; 13 Classical inverse scattering method; 14 Symplectic geometry; 15 Riemann surfaces; 16 Lie algebras; Index.
Summary: A clear and pedagogical introduction to classical integrable systems and their applications. It synthesises the different approaches to the subject, providing a set of interconnected methods for solving problems in mathematical physics. Each method is introduced and explained, before being applied to particular examples.
Holdings
Item type Current library Collection Call number Status Date due Barcode Item holds
eBook eBook e-Library EBSCO Science Available
Total holds: 0

Includes bibliographical references and index.

Cover; Half-title; Series-title; Title; Copyright; Contents; 1 Introduction; 2 Integrable dynamical systems; 3 Synopsis of integrable systems; 4 Algebraic methods; 5 Analytical methods; 6 The closed Toda chain; 7 The Calogero-Moser model; 8 Isomonodromic deformations; 9 Grassmannian and integrable hierarchies; 10 The KP hierarchy; 11 The KdV hierarchy; 12 The Toda field theories; 13 Classical inverse scattering method; 14 Symplectic geometry; 15 Riemann surfaces; 16 Lie algebras; Index.

A clear and pedagogical introduction to classical integrable systems and their applications. It synthesises the different approaches to the subject, providing a set of interconnected methods for solving problems in mathematical physics. Each method is introduced and explained, before being applied to particular examples.

Print version record.

Added to collection customer.56279.3

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