A generalized AKNS hierarchy, bi-Hamiltonian structure, and Darboux transformation

A new generalized AKNS hierarchy is presented starting from a 4 × 4 matrix spectral problem with four potentials. Its generalized bi-Hamiltonian structure is also investigated by using the trace identity. Moreover, the special coupled nonlinear equation, the coupled KdV equation, the KdV equation, the coupled mKdV equation and the mKdV equation are produced from the generalized AKNS hierarchy. Most importantly, a Darboux transformation for the generalized AKNS hierarchy is established with the aid of the gauge transformation between the corresponding 4 × 4 matrix spectral problem, by which multiple soliton solutions of the generalized AKNS hierarchy are obtained. As a reduction, a Darboux transformation of the mKdV equation and its new analytical positon, negaton and complexiton solutions are given.

► A new generalized AKNS hierarchy and its generalized bi-Hamiltonian structure are presented. ► A new Darboux transformation for the generalized AKNS hierarchy is established. ► Solutions for the generalized AKNS hierarchy and mKdV equation are obtained by the Darboux transformation and its reductions.