The Perturbed Non-traveling Wave Double Solitary and Periodic Solutions for (2+1)-D KD Equation
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O175.2

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    Abstract:

    Based on the decoupling transformation and the Lie point symmetry group method, the (2+1)-D KD equation is reduced to the (1+1)-D nonlinear PDE. By extended homoclinic test approach, new perturbed non-traveling wave double solitary solutions of the (2+1)-D KD equation are obtained. Also, the dynamic critical point and the non-traveling wave rational function singular solutions in the limitation of parameters are derived. Applying the Hamilton function in 2-D planar dynamical system, we discuss the existence of the periodic solutions for the symmetrical and reduced equation with the wave transformation. Moreover, some periodic solutions are derived by the Tan-function test method, and the perturbed non-traveling wave periodic solutions for the (2+1)-D KD equation are shown.

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Cite this article as: KANG Xiao-Rong, XIAN Da-Quan. The Perturbed Non-traveling Wave Double Solitary and Periodic Solutions for (2+1)-D KD Equation [J]. J Sichuan Univ: Nat Sci Ed, 2017, 54: 477.

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History
  • Received:October 28,2016
  • Revised:January 03,2017
  • Adopted:January 06,2017
  • Online: June 04,2017
  • Published: