Some remarks on the coherent-state variational approach to nonlinear boson models

Abstract

The mean-field pictures based on the standard time-dependent variational approach have widely been used in the study of nonlinear many-boson systems such as the Bose-Hubbard model. The mean-field schemes relevant to Gutzwiller-like trial states |F>, number-preserving states | > and Glauber-like trial states |Z> are compared to evidence the specific properties of such schemes. After deriving the Hamiltonian picture relevant to |Z> from that based on |F>, the latter is shown to exhibit a Poisson algebra equipped with a Weyl-Heisenberg subalgebra which preludes to the |Z>-based picture. Then states |Z> are shown to be a superposition of N-boson states |> and the similarities/differences of the |Z>-based and |>-based pictures are discussed. Finally, after proving that the simple, symmetric state |> indeed corresponds to a SU(M) coherent state, a dual version of states |Z> and |> in terms of momentum-mode operators is discussed together with some applications.