A new generalization of the (2+1)-dimensional Davey-Stewartson equation

Ji Lin; Xiao Yan Tang; Sen Yue Lou; Ke Lin Wang

doi:10.1515/zna-2001-0902

A new generalization of the (2+1)-dimensional Davey-Stewartson equation

Ji Lin
, Xiao Yan Tang
, Sen Yue Lou^*
, Ke Lin Wang

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

3 Scopus citations

Abstract

Using an asymptotically exact reduction method based on Fourier expansion and spatiotemporal re-scaling, a new integrable system of the nonlinear partial differential equation in (2+1)-dimensions, extended Davey-Stewartson I equation, is deduced from a known (2+1)-dimensional integrable equation. The integrability of the new equation system is explicitly proved by the spectral transformation. Actually, the corresponding Lax pair of the new equations can be obtained by applying the same reduction method to the Lax pair of the original equation.

Original language	English
Pages (from-to)	613-618
Number of pages	6
Journal	Zeitschrift fur Naturforschung - Section A Journal of Physical Sciences
Volume	56
Issue number	9-10
DOIs	https://doi.org/10.1515/zna-2001-0902
State	Published - 2001
Externally published	Yes

Keywords

Davey-Stewartson I equation
Fourier asymptotical expansion
Integrable models

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10.1515/zna-2001-0902

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title = "A new generalization of the (2+1)-dimensional Davey-Stewartson equation",

abstract = "Using an asymptotically exact reduction method based on Fourier expansion and spatiotemporal re-scaling, a new integrable system of the nonlinear partial differential equation in (2+1)-dimensions, extended Davey-Stewartson I equation, is deduced from a known (2+1)-dimensional integrable equation. The integrability of the new equation system is explicitly proved by the spectral transformation. Actually, the corresponding Lax pair of the new equations can be obtained by applying the same reduction method to the Lax pair of the original equation.",

keywords = "Davey-Stewartson I equation, Fourier asymptotical expansion, Integrable models",

author = "Ji Lin and Tang, \{Xiao Yan\} and Lou, \{Sen Yue\} and Wang, \{Ke Lin\}",

year = "2001",

doi = "10.1515/zna-2001-0902",

language = "英语",

volume = "56",

pages = "613--618",

journal = "Zeitschrift fur Naturforschung - Section A Journal of Physical Sciences",

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T1 - A new generalization of the (2+1)-dimensional Davey-Stewartson equation

AU - Lin, Ji

AU - Tang, Xiao Yan

AU - Lou, Sen Yue

AU - Wang, Ke Lin

PY - 2001

Y1 - 2001

N2 - Using an asymptotically exact reduction method based on Fourier expansion and spatiotemporal re-scaling, a new integrable system of the nonlinear partial differential equation in (2+1)-dimensions, extended Davey-Stewartson I equation, is deduced from a known (2+1)-dimensional integrable equation. The integrability of the new equation system is explicitly proved by the spectral transformation. Actually, the corresponding Lax pair of the new equations can be obtained by applying the same reduction method to the Lax pair of the original equation.

AB - Using an asymptotically exact reduction method based on Fourier expansion and spatiotemporal re-scaling, a new integrable system of the nonlinear partial differential equation in (2+1)-dimensions, extended Davey-Stewartson I equation, is deduced from a known (2+1)-dimensional integrable equation. The integrability of the new equation system is explicitly proved by the spectral transformation. Actually, the corresponding Lax pair of the new equations can be obtained by applying the same reduction method to the Lax pair of the original equation.

KW - Davey-Stewartson I equation

KW - Fourier asymptotical expansion

KW - Integrable models

UR - https://www.scopus.com/pages/publications/0039890097

U2 - 10.1515/zna-2001-0902

DO - 10.1515/zna-2001-0902

M3 - 文章

AN - SCOPUS:0039890097

SN - 0932-0784

VL - 56

SP - 613

EP - 618

JO - Zeitschrift fur Naturforschung - Section A Journal of Physical Sciences

JF - Zeitschrift fur Naturforschung - Section A Journal of Physical Sciences

IS - 9-10

ER -

A new generalization of the (2+1)-dimensional Davey-Stewartson equation

Abstract

Keywords

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