[1] Bansal A, Gupta R K. Modified (G′/G)-expansion method for finding exact wave solutions of the coupled Klein-CGordon-Schr dinger equation [J]. Applied Mathematics and Computation, 2012, 35: 1175-1187.
[2] Fan Engui, et al. Applications of the Jacobi elliptic function method to special-type nonlinear equations [J]. Physics Letter A, 2002, 305: 383-392.
[3] He Jihuan, Wu Xuhong. Exp-function method for nonlinear wave equation [J]. Chaos, Solitons and Fractals, 2006, 30: 700-708.
[4] Khater A H, Helal M A, El-Kalaawy O H. B cklund transformations: Exact solutions for the KdV and the Calogero-Degasperis-Fokas mKdV equations [J]. Mathematical Methods in the Applied Sciences, 1998, 21: 719-731.
[5] Zedan H A, Tantawy S S. Exact solutions for a perturbed nonlinear Schr dinger equation by using B cklund transformations [J]. Mathematical Methods in the Applied Sciences, 2009, 32: 1068-1081.
[7] Zhang Yingyuan, Liu Xiqiang, et al. Symmetry reductions and exact solutions of the (2+1)-dimensional Jaulent-Miodek equation [J]. Applied Mathematics and Computation, 2012, 219: 911-916.
[8] Bruzón M S, Gandarias M L. Symmetry reductions and traveling wave solutions for the Krichever-Novikov equation [J]. Mathematical Methods in the Applied Sciences, 2012, 35: 869-876.
[10] Chen Mei, Liu Xiqiang. Symmetries and exact solutions of the breaking soliton equation [J]. Communications in Theoretical Physics, 2011, 56: 851-855.
[12] Wang Ling, Liu Xiqing, et al. Study of (2+1)-dimensional higher-order Broer-Kaupsystem [J]. Communications in Theoretical Physics, 2007, 47: 403-408.
[13] Zayed E M E. Traveling wave solutions for higher dimensional nonlinear evolution equations using the (G′/G)-expansion method [J]. Journal of Applied Mathematics and Informatics, 2010, 28: 383-395.
[14] Naher H, Abdullah F A, Ali M. New traveling wave solutions of the higher dimensional nonlinear partial differential equation by the Exp-function method [J]. Journal of Applied Mathematics, 2012, 2012: 575-387.
[16] Bai Chenlin, Zhao Hong. A generalized variable-coefficient algebraic method exactly solving (3+1)-dimensional Kadomtsev-Petviashvilli equation [J]. Communications in Theoretical Physics, 2005, 44: 821-826.
[17] Clarkson P A. Painleve equations-nonlinear special functions [J]. Applied Mathematics and Computation, 2003, 153: 127-140.
[18] Ibragimov N H. A new conservation theorem [J]. Journal of Mathematical Analysis Application, 2007, 333: 311-328.
