A consistent tanh expansion (GTE) method is developed for the dispersion water wave (DWW) system. For the GTE solvable DWW system, there are two branches related to tanh expansion, the main branch is consistent while the auxiliary branch is not consistent. From the consistent branch, we can obtain infinitely many exact significant solutions including the soliton-resonant solutions and soliton-periodic wave interactions. From the inconsistent branch, only one special solution can be found. The GTE related nonlocal symmetries are also proposed. The nonlocal symmetries can be localized to find finite Backlund transformations by prolonging the model to an enlarged one.

• 出版日期2014-5
• 单位宁波大学; 上海交通大学