Bäcklund Transformations and the Painlevé property

  • John Weiss
Part of the NATO ASI Series book series (ASIC, volume 310)

Abstract

For systems with the Painlevé Property, Bäcklund transformations can be defined. These appear as specializations (truncations) of certain expansions of the solution about its singular manifold. With reference to the Lax pair for a system, the Bäcklund transformations are equivalent to transformations of linear systems developed by Darboux (Bäcklund-Darboux transformations).

For specific systems the Bäcklund-Darboux transformations lead to a reformulation of these systems in terms of the Schwarzian derivative. We find the Bäcklund transformations of these systems and study their periodic fixed points.

The periodic fixed points of the Bäcklund transformations determine a finite dimensional invariant manifold for the flow of the system. The resulting (ordinary) differential equations have a hamiltonian structure and the flow of the (partial) differential system is represented by commuting flows on the finite dimensional manifold.

Keywords

Hamiltonian Structure Toda Lattice Schwarzian Derivative Singular Manifold Backlund Transformation 
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.

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Copyright information

© Kluwer Acadamic 1990

Authors and Affiliations

  • John Weiss
    • 1
  1. 1.ArlingtonUSA

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