N-soliton solutions and nonlinear dynamics for two generalized Broer-Kaup systems

Under consideration in this paper are two nonlinear evolution models: One is the (1 + 1)-dimensional generalized Broer-Kaup (gBK) system derived by Zhang et al. (Appl Math Comput 219:5837-5848, 2013), and the other is the (2 + 1)-dimensional gBK system reported for the first time. Based on the bilinear forms given in this paper, novel N-soliton solutions of these two gBK systems are obtained by using Hirota's bilinear method. As a comparison, the obtained two-soliton solutions of the (1 + 1)-dimensional gBK system are taken to demonstrate the difference from the known ones constructed by Darboux transformation. In order to understand the nonlinear dynamics localized in the gBK systems, local structures of the obtained one-, two-, three- and four-soliton solutions are shown. This paper reveals that each pair of the obtained N-soliton solutions of the gBK systems couple bell and kink soliton dynamics.

Automated summary

This paper discusses two nonlinear evolution models and obtains novel N-soliton solutions of generalized Broer-Kaup systems using the bilinear method. It demonstrates the characteristics of soliton solutions in different dimensions and reveals the dynamics within these solutions.