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Preliminary group classification of quasilinear third-order evolution equations

Preliminary group classification of quasilinear third-order evolution equations
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摘要 Group classification of quasilinear third-order evolution equations is given by using the classical infinitesimal Lie method, the technique of equivalence transformations, and the theory of classification of abstract low-dimensional Lie algebras. We show that there are three equations admitting simple Lie algebras of dimension three. All non-equivalent equations admitting simple Lie algebras are nothing but these three. Furthermore, we also show that there exist two, five, twenty-nine and twenty-six non- equivalent third-order nonlinear evolution equations admitting one-, two-, three-, and four-dimensional solvable Lie algebras, respectively. Group classification of quasilinear third-order evolution equations is given by using the classical infinitesimal Lie method, the technique of equivalence transformations, and the theory of classification of abstract low-dimensional Lie algebras. We show that there are three equations admitting simple Lie algebras of dimension three. All non-equivalent equations admitting simple Lie algebras are nothing but these three. Furthermore, we also show that there exist two, five, twenty-nine and twenty-six non- equivalent third-order nonlinear evolution equations admitting one-, two-, three-, and four-dimensional solvable Lie algebras, respectively.
出处 《Applied Mathematics and Mechanics(English Edition)》 SCIE EI 2009年第3期275-292,共18页 应用数学和力学(英文版)
基金 supported by the National Key Basic Research Project of China (973 Program)(No. 2004CB318000)
关键词 quasilinear third-order evolution equations group classification classical infinitesimal Lie method equivalence transformation group abstract Lie algebras quasilinear third-order evolution equations, group classification, classical infinitesimal Lie method, equivalence transformation group, abstract Lie algebras
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参考文献10

  • 1.Symmetries Exact Solutions and Conservation Laws[].CRC Handbook of Lie Group Analysis of Di-erential Equations.1994
  • 2Stephani,H.Di-erential Equation:Their Solution Using Symmetries[]..1994
  • 3Huang,Dingjiang,Ivanova,N.M.Group analysis and exact solutions of a class of variable coe-cient nonlinear telegraph equations[].Journal of Mathematical Physics.2007
  • 4Lahno,V.I,Zhdanov,R.Z,Magda,O.Group classification and exact solutions of nonlinear wave equations[].Acta ApplMath.2006
  • 5Huang,Dingjiang.Nonlinear Wave,Geometical Integrability and Group Classification[]..2007
  • 6Olver PJ.Applications of Lie groups to differential equations[]..1986
  • 7Bluman G,Anco S.C.Symmetry and integration methods for differential equations[].ApplMathSci.2002
  • 8Bluman G W and Kumei S.Symmetries and Differential Equations[].Appl Math Sci No Springer New York.1989
  • 9Fushchych W I,Shtelen W M,Serov N I.Symmetry Analysis and Exact Solutions of Nonlinear Equations of Mathematical Physics[]..1993
  • 10Fushchych W I,Zhdanov R Z.Symmetries and Exact Solutions of Nonlinear Dirac Equations[]..1997

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