›› 2015, Vol. 24 ›› Issue (3): 30202-030202.doi: 10.1088/1674-1056/24/3/030202
刘希忠, 俞军, 任博
Liu Xi-Zhong (刘希忠), Yu Jun (俞军), Ren Bo (任博)
摘要: The Bäcklund transformation related symmetry is nonlocal, which is hard to be applied in constructing solutions for nonlinear equations. In this paper, the residual symmetry of the Boussinesq equation is localized to Lie point symmetry by introducing multiple new variables. By applying the general Lie point method, two main results are obtained: a new type of Bäcklund transformation is derived, from which new solutions can be generated from old ones; the similarity reduction solutions as well as corresponding reduction equations are found. The localization procedure provides an effective way to investigate interaction solutions between nonlinear waves and solitons.
中图分类号: (Partial differential equations)