2+1维广义Calogero-Bogoyavlenskii-Schiff方程的无穷多对称及其约化

[1] (2+1)维离散型Toda方程的对称性 [J]. 物理学报, 1996, (05) : 721 - 728

[2] 非线性2+1维Khokhlov-Zabolotskaya方程的无穷多对称及其代数结构 [J]. 物理学报, 1995, (05) : 673 - 677

[3] Nonlinear evolution equations solvable by the inverse spectral transform.—I[J] . F. Calogero,A. Degasperis.Il Nuovo Cimento B Series 11 . 1976 (2)

[4] The Calogero–Bogoyavlenskii–Schiff Equation in 2+1 Dimensions[J] . M. S. Bruzón,M. L. Gandarias,C. Muriel,J. Ramírez,S. Saez,F. R. Romero.Theoretical and Mathematical Physics . 2003 (1)

[5] Li J H,Jia M,Lou S Y. J.Phys.A:Math.Theor . 2007

[6] Painleve test for the certain （2+1）-dimensional nonlinear evolution equations. T. Alagesan,Y. Chung,and K. Nakkeeran. Chaos Solitons Fractals . 2005

[1] (2+1)维离散型Toda方程的对称性 [J]. 物理学报, 1996, (05) : 721 - 728

[2] 非线性2+1维Khokhlov-Zabolotskaya方程的无穷多对称及其代数结构 [J]. 物理学报, 1995, (05) : 673 - 677

[3] Nonlinear evolution equations solvable by the inverse spectral transform.—I[J] . F. Calogero,A. Degasperis.Il Nuovo Cimento B Series 11 . 1976 (2)

[4] The Calogero–Bogoyavlenskii–Schiff Equation in 2+1 Dimensions[J] . M. S. Bruzón,M. L. Gandarias,C. Muriel,J. Ramírez,S. Saez,F. R. Romero.Theoretical and Mathematical Physics . 2003 (1)

[5] Li J H,Jia M,Lou S Y. J.Phys.A:Math.Theor . 2007

[6] Painleve test for the certain （2+1）-dimensional nonlinear evolution equations. T. Alagesan,Y. Chung,and K. Nakkeeran. Chaos Solitons Fractals . 2005