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Title
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General soliton solutions of an n-dimensional complex Ginzburg-Landau equation
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Author
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Abstract
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| Applying the function transformation method, an n-dimensional complex Ginzburg-Landau equation is transformed to a sine-Gordon equation, sinh-Gordon equation and other equations, which depends only on one function, zeta; and can be solved. The general solution of the equations in I leads to a general soliton solution of an n-dimensional complex Ginzburg-Landau equation. It contains some interesting specific solutions such as the N multiple solitons, the propagational breathers and the quadric solitons. |
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Language
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English
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Source (journal)
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Physica scripta : supplements / Royal Swedish Academy of Sciences. - Stockholm, 1982, currens
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Publication
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Stockholm
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Royal Swedish Academy of Sciences
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2000
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ISSN
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0281-1847
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DOI
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10.1238/PHYSICA.REGULAR.062A00353
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Volume/pages
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62
:5
(2000)
, p. 353-357
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ISI
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000165374900001
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Full text (Publisher's DOI)
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Full text (publisher's version - intranet only)
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