Darboux transformation for the vector sine-Gordon equation and integrable equations on a sphere
Mikhailov, AV, Papamikos, G and Wang, JP
(2016)
Darboux transformation for the vector sine-Gordon equation and integrable equations on a sphere.
Letters in Mathematical Physics, 106 (7).
pp. 973-996.
ISSN 0377-9017
Abstract
We propose a method for construction of Darboux transformations, which is a new development of the dressing method for Lax operators invariant under a reduction group. We apply the method to the vector sine-Gordon equation and derive its Bäcklund transformations. We show that there is a new Lax operator canonically associated with our Darboux transformation resulting an evolutionary differential-difference system on a sphere. The latter is a generalised symmetry for the chain of Bäcklund transformations. Using the re-factorisation approach and the Bianchi permutability of the Darboux transformations we derive new vector Yang-Baxter map and integrable discrete vector sine-Gordon equation on a sphere.
Metadata
Item Type:
Article
Authors/Creators:
Mikhailov, AV
Papamikos, G
Wang, JP
Copyright, Publisher and Additional Information:
(c) Springer Science+Business Media Dordrecht, 2016. This is an author produced version of a paper published in Letters in Mathematical Physics. Uploaded in accordance with the publisher's self-archiving policy. The final publication is available at Springer via http://doi.org/10.1007/s11005-016-0855-5
Keywords:
The vector sine-Gordon equation; Lax representations; Darboux transformations; Bäcklund transformations; Yang-Baxter maps; integrable equations on a sphere
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