Darboux Transformations in Integrable Systems

Theory and their Applications to Geometry

  • Chaohao Gu
  • Hesheng Hu
  • Zixiang Zhou

Part of the Mathematical Physics Studies book series (MPST, volume 26)

Table of contents

  1. Front Matter
    Pages i-x
  2. Chaohao Gu, Hesheng Hu, Zixiang Zhou
    Pages 1-64
  3. Chaohao Gu, Hesheng Hu, Zixiang Zhou
    Pages 65-101
  4. Chaohao Gu, Hesheng Hu, Zixiang Zhou
    Pages 103-120
  5. Chaohao Gu, Hesheng Hu, Zixiang Zhou
    Pages 189-235
  6. Chaohao Gu, Hesheng Hu, Zixiang Zhou
    Pages 237-266
  7. Back Matter
    Pages 299-310

About this book


The Darboux transformation approach is one of the most effective methods for constructing explicit solutions of partial differential equations which are called integrable systems and play important roles in mechanics, physics and differential geometry.

This book presents the Darboux transformations in matrix form and provides purely algebraic algorithms for constructing the explicit solutions. A basis for using symbolic computations to obtain the explicit exact solutions for many integrable systems is established. Moreover, the behavior of simple and multi-solutions, even in multi-dimensional cases, can be elucidated clearly. The method covers a series of important equations such as various kinds of AKNS systems in R1+n, harmonic maps from 2-dimensional manifolds, self-dual Yang-Mills fields and the generalizations to higher dimensional case, theory of line congruences in three dimensions or higher dimensional space etc. All these cases are explained in detail. This book contains many results that were obtained by the authors in the past few years.


The book has been written for specialists, teachers and graduate students (or undergraduate students of higher grade) in mathematics and physics.


Darboux transformations Minkowski space differential equations differential geometry integrable systems inverse scattering theory scattering theory two-dimensional manifolds

Authors and affiliations

  • Chaohao Gu
    • 1
  • Hesheng Hu
    • 1
  • Zixiang Zhou
    • 1
  1. 1.Fudan UniversityShanghaiChina

Bibliographic information

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