Integrable system with peakon, weak kink, and kink-peakon interactional solutions

Abstract

In this paper, we study an integrable system with both quadratic and cubic nonlinearity: mt=bux+1/2k1[m(u2-u2x)]x+1/2k2(2m ux+mxu), m=u-uxx, where b, k1 and k2 are arbitrary constants. This model is kind of a cubic generalization of the Camassa-Holm (CH) equation: mt+mxu+2mux=0. The equation is shown integrable with its Lax pair, bi-Hamiltonian structure, and infinitely many conservation laws. In the case of b=0, the peaked soliton (peakon) and multi-peakon solutions are studied. In particular, the two-peakon dynamical system is explicitly presented and their collisions are investigated in details. In the case of b≠0 and k2=0, the weak kink and kink-peakon interactional solutions are found. Significant difference from the CH equation is analyzed through a comparison. In the paper, we also study all possible smooth one-soliton solutions for the system.