This talk is devoted to the analysis of multi-value methods for the numerical integration of Hamiltonian problems. Even if the numerical flow generated by such a method cannot be symplectic, a concept of near conservation can be considered, i.e. G-symplecticity, which implies conjugate-symplecticity of the underlying one step method associated to the original multi-value scheme. It is known that multi-value methods introduce parasitic components in the numerical solution, deteriorating the overall accuracy and the ability of preserving the invariants of Hamiltonian systems; however, a remedy against the effects of parasitism is discussed, together with its longterm counterpart: indeed, a backward error analysis is presented, which permits t...