Citation: | HUANG Ding-jiang, ZHANG Hong-qing. Preliminary Group Classification of Quasi-Linear Third Order Evolution Equations[J]. Applied Mathematics and Mechanics, 2009, 30(3): 265-281. |
[1] |
Bluman G,Anco S C.Symmetry and Integration Methods for Differential Equations[M].New York:Springer,2002.
|
[2] |
Bluman G W,Kumei S.Symmetries and Differential Equations[M].New York:Springer,1989.
|
[3] |
Fushchych W I,Shtelen W M,Serov N I.Symmetry Analysis and Exact Solutions of Nonlinear Equations of Mathematical Physics[M].Dordrecht:Kluwer,1993.
|
[4] |
Fushchych W I,Zhdanov R Z.Symmetries and Exact Solutions of Nonlinear Dirac Equations[M].Kyiv:Naukova Ukraina,1997.
|
[5] |
Ibragimov N H.Transformation Groups Applied to Mathematical Physics[M].Dordrecht:D Reidel Publishing Co.,1985.
|
[6] |
Ibragimov N H.Lie Group Analysis of Differential Equations—Symmetries,Exact Solutions and Conservation Laws[M].Vol 1.Boca Raton:CRC Press,1994.
|
[7] |
Ibragimov N H.Elementary Lie Group Analysis and Ordinary Differential Equations[M].New York:Wiley,1999.
|
[8] |
Olver P J.Application of Lie Groups to Differential Equations[M].New York:Springer-Verlag,1986.
|
[9] |
Ovsiannikov L V.Group Analysis of Differential Equations[M].New York:Academic Press,1982.
|
[10] |
Stephani H.Differential Equation:Their Solution Using Symmetries[M].Cambridge:Cambridge University Press,1994.
|
[11] |
Lie S,Engel F.Theorie der Transformationsgruppen[M].3Bd.Leipzig:Teubner.1888,1890,1893.
|
[12] |
Lie S.On integration of a class of Linear partial differential equations by means of definite integrals[A].In:Ibragimov N H Ed.CRC Handbook of Lie Group Analysis of Differential Equations[C]. Vol.2,Boca Raton:CRC Press, 1994,473-508.(Translation by Ibragimov N H of Arch for Math,Bd.VI,Heft 3,328-368,Kristiania 1881).
|
[13] |
Gazeau J P,Winternitz P.Symmetries of variable coefficient Korteweg-de Vries equations[J].J Math Phys,1992,33(12):4087-4102. doi: 10.1063/1.529807
|
[14] |
Güngr F,Lahno V I,Zhdanov R Z.Symmetry classification of KdV-type nonlinear evolution equations[J].J Math Phys,2004,45(6):2280-2313. doi: 10.1063/1.1737811
|
[15] |
Basarab-Horwath P,Lahno V,Zhdanov R.The structure of Lie algebras and the classification problem for partial differential equations[J].Acta Applicandae Mathematicae,2001,69(1):43-94. doi: 10.1023/A:1012667617936
|
[16] |
Bluman G,Temuerchaolu,Sahadevan R.Local and nonlocal symmetries for nonlinear telegraph equation[J].J Math Phys,2005,46(2):023505. doi: 10.1063/1.1841481
|
[17] |
QU Chang-zheng.Allowed transformations and symmetry class of variable-coefficient Burgers equations[J].IMA J Appl Math,1995,54(3):203-225. doi: 10.1093/imamat/54.3.203
|
[18] |
HUANG Ding-jiang,Ivanova N M.Group analysis and exact solutions of a class of variable coefficient nonlinear telegraph equations[J].J Math Phys,2007,48(7):073507. doi: 10.1063/1.2747724
|
[19] |
Zhdanov R Z,Lahno V I.Group classification of heat conductivity equations with a nonlinear source[J].J Phys A:Math Gen,1999,32:7405-7418. doi: 10.1088/0305-4470/32/42/312
|
[20] |
Lahno V I,Zhdanov R Z.Group classification of nonlinear wave equations[J].J Math Phys,2005,46(5):053301. doi: 10.1063/1.1884886
|
[21] |
Lahno V I,Zhdanov R Z,Magda O.Group classification and exact solutions of nonlinear wave equations[J].Acta Appl Math,2006,91(3):253-313. doi: 10.1007/s10440-006-9039-0
|
[22] |
Zhdanov R Z,Lahno V I.Group classification of the general evolution equation:Local and quasilocal symmetries[J].Symmetry Integrability and Geometry:Methods and Applications,2005,1:009.
|
[23] |
黄定江.非线性波、几何可积性与群分类[D].博士学位论文,大连:大连理工大学,2007.
|
[24] |
Basarab-Horwath P,Gungor F,Lahno V.Symmetry classification of third-order nonlinear evolution equations[Z]. arXiv,2008,nlin.SI-0802.0367v1:1-73.
|
[25] |
Gagnon L,Winternitz P.Symmetry classes of variable coefficient nonlinear Schrdinger equations[J].J Phys A:Math Gen,1993,26:7061-7076. doi: 10.1088/0305-4470/26/23/043
|
[26] |
Gómez-Ullate D,Lafortune S,Winternitz P.Symmetries of discrete dynamical systems involving two species[J].J Math Phys,1999,40(6):2782-2804. doi: 10.1063/1.532728
|
[27] |
Gungor F,Winternitz P.Generalized Kadomtsev-Petviashvili equation with an infinite dimensional symmetry algebra[J].J Math Anal Appl,2002,276:314-328. doi: 10.1016/S0022-247X(02)00445-6
|
[28] |
Levi D,Winternitz P.Symmetries of discrete dynamical systems[J].J Math Phys,1996,37(11):5551-5576. doi: 10.1063/1.531722
|
[29] |
Lafortune S,Tremblay S,Winternitz P.Symmetry classification of diatomic molecular chains[J].J Math Phys,2001,42(11):5341-5357. doi: 10.1063/1.1398583
|
[30] |
Zhdanov R Z,Fushchych W I,Marko P V.New scale-invariant nonlinear differential equations for a complex scalar field[J].Physica D,1996,95(2):158-162. doi: 10.1016/0167-2789(96)00047-4
|
[31] |
Zhdanov R,Roman O.On preliminary symmetry classification of nonlinear Schrdinger equation with some applications of Doebner-Goldin models[J].Rep Math Phys,2000,45:273-291. doi: 10.1016/S0034-4877(00)89037-0
|
[32] |
Lie S.Gesammelte Abhandlungen[M].Vol 5.Leipzig:Teubner,1924.
|
[33] |
Lie S.Gesammelte Abhandlungen[M].Vol 6.Leipzig:Teubner,1927.
|