Twisted hierarchies associated with the generalized sine-Gordon equation
Abstract
Twisted U- and twisted U/K-hierarchies are soliton hierarchies introduced by Terng to find higher flows of the generalized sine-Gordon equation. Twisted O(J,J)O(J)× O(J)-hierarchies are among the most important classes of twisted hierarchies. In this paper, interesting first and higher flows of twisted O(J,J)O(J)× O(J)-hierarchies are explicitly derived, the associated submanifold geometry is investigated and a unified treatment of the inverse scattering theory is provided.
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