Papers by Author: Bang Qing Li

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Authors: Yu Lan Ma, Bang Qing Li
Abstract: Based on the non-traveling wave solution and Rossler chaos system, chaotic soliton excitations are established for the nonlinear (3+1)-dimensional burgers system. The chaotic behavior and chaotic evolution of the system are investigated.
774
Authors: Bang Qing Li, Yu Lan Ma
Abstract: By introducing (G′/G)-expansion method and symbolic computation software MAPLE, two types of new exact solutions are constructed for coupled mKdV equations. The solutions included trigonometric function solutions and hyperbolic function solutions. The procedure is concise and straightforward, and the method is also helpful to find exact solutions for other nonlinear evolution equations.
184
Authors: Bang Qing Li, Mei Ping Xu, Yu Lan Ma
Abstract: Extending a symbolic computation algorithm, namely, (G′/G)-expansion method, a new series of exact solutions are constructed for (2+1)-dimensional generalization of shallow water wave equation. These solutions included hyperbolic function solution, trigonometric function solution and rational function solution. The procedure can illustrate that the new algorithm is concise, powerful and straightforward, and it can also be applied to find exact solutions for other high dimensional nonlinear evolution equations.
1516
Authors: Bang Qing Li, Yu Lan Ma, Mei Ping Xu
Abstract: Based on the non-traveling wave solution and a chemical chaos system, chaotic soliton excitations are established for the nonlinear (3+1)-dimensional Burgers system. The chaotic behavior and chaotic evolution of the system are studied.
334
Authors: Bang Qing Li, Cong Wang
Abstract: Applying a symbolic computation algorithm, namely, the improved Hirota bilinear method, a new type of the N-soliton solutions is obtained for the (2+1)-dimensional nonlinear dissipative Zabolotskaya-Khokhlov system. The solutions can be expressed explicitly. Furthermore, the evolution process is investigated for the N-soliton solutions
564
Authors: Yu Lan Ma, Bang Qing Li
Abstract: The exact soliton solutions are constructed by extending the (G'/G)-expansion method for the nonlinear ITO system. The soliton controls are investigated. The soliton shapes can be under the control of the parameters related to the (G'/G)-expansion method.
762
Authors: Yu Lan Ma, Bang Qing Li
Abstract: By introducing the (G'/G)-expansion method, the exact soliton solution is constructed for generalized burgers-fisher system. The two classes of soliton, namely, kink-like soliton and anti-kink-like soliton are studied for the system.
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