Direct Similarity Solution Method and Comparison with the Classical Lie Symmetry Solutions

Abstract We study the general applicability of the Clarkson–Kruskal’s direct method, which is known to be related to symmetry reduction methods, for the similarity solutions of nonlinear evolution equations (NEEs). We give a theorem that will, when satisfied, immediately simplify the reduction procedure or ansatz before performing any explicit reduction expansions. We shall apply the method to both scalar and vector NEEs in either 1+1 or 2+1 dimensions, including in particular, a variable coefficient KdV equation and the 2+1 dimensional Khokhlov–Zabolotskaya equation. Explicit solutions that are beyond the classical Lie symmetry method are obtained, with comparison discussed in this connection.

[1]  Philip Broadbridge,et al.  Nonclassical symmetry solutions and the methods of Bluman–Cole and Clarkson–Kruskal , 1993 .

[2]  Lou Sen-yue,et al.  Nonclassical analysis and Painleve property for the Kupershmidt equations , 1993 .

[3]  M. C. Nucci,et al.  The nonclassical method is more general than the direct method for symmetry reductions. An example of the Fitzhugh-Nagumo equation , 1992 .

[4]  S. Lou,et al.  Similarity reductions of the KP equation by a direct method , 1991 .

[5]  Peter A. Clarkson,et al.  Nonclassical symmetry reductions for the Kadomtsev-Petviashvili equation , 1991 .

[6]  S. Lou,et al.  A note on the new similarity reductions of the Boussinesq equation , 1990 .

[7]  Sen-uye Lou,et al.  Similarity solutions of the Kadomtsev-Petviashvili equation , 1990 .

[8]  G. Bluman,et al.  Symmetries and differential equations , 1989 .

[9]  M. Kruskal,et al.  New similarity reductions of the Boussinesq equation , 1989 .

[10]  Decio Levi,et al.  Non-classical symmetry reduction: example of the Boussinesq equation , 1989 .

[11]  P. Clarkson New similarity solutions for the modified Boussinesq equation , 1989 .

[12]  M. J. Vedan,et al.  A variable coefficient Korteweg–de Vries equation: Similarity analysis and exact solution. II , 1986 .

[13]  A. Chowdhury,et al.  Towards the conservation laws and Lie symmetries for the Khokhlov-Zabolotskaya equation in three dimensions , 1986 .

[14]  R. Hirota,et al.  Soliton solutions of a coupled Korteweg-de Vries equation , 1981 .