By using trace identity, the generalized Hamiltonian structure is given.

The Hamilton structure of the hierarchy with t he trace identity is obtained.

By using the trace identity, biHamiltonian structures of a family of equations are given, moreover, it is shown that this hierarchy is integrable in the Liouville′s sense.

Based on a new isospectral problem,this paper deduces a hierarchy of new generalized Kaup-Newell equations by using the Tu scheme.

By using of Tu scheme and extended trace identity,the integrable coupling and the Hamiltonian structures of the AKNS hierarchy are obtained when properly choosing the isospectral problem.