The Quantum Josephson Hamiltonian In The Phase Representation
arXiv:cond-mat/0011440
Abstract
The quantum Josephson Hamiltonian of two weakly linked Bose-Einstein condensates is written in an overcomplete phase representation, thus avoiding the problem of defining a Hermitian phase operator. We discuss the limit of validity of the standard, non-rigorous Mathieu equation, due to the onset of a higher order $\cos 2 Ï$ term in the Josephson potential, and also to the overcompleteness of the representation (the phase $Ï$ being the relative phase between the two condensates). We thereby unify the Boson Hubbard and Quantum Phase models.