Bifurcations and Dynamics of Traveling Wave Solutions to a Fujimoto-Watanabe Equation**Supported by the National Natural Science Foundation of China under Grant No. 11701191 and Subsidized Project for Cultivating Postgraduates’ Innovative Ability in Scientific Research of Huaqiao University

Abstract

In this paper, we study the bifurcations and dynamics of traveling wave solutions to a Fujimoto-Watanabe equation by using the method of dynamical systems. We obtain all possible bifurcations of phase portraits of the system in different regions of the parametric space. Then we show the sufficient conditions to guarantee the existence of traveling wave solutions including solitary wave solutions, periodic wave solutions, compactions and kink-like and antikink-like wave solutions. Moreover, the expressions of solitary wave solutions and periodic wave solutions are implicitly given, while the expressions of kink-like and antikink-like wave solutions are explicitly shown. The dynamics of these new traveling wave solutions will greatly enrich the previews results and further help us understand the physical structures and analyze the propagation of the nonlinear wave.