Stability of current-carrying states in hard-core bosons with long-range hopping on a square lattice

Abstract

We investigate the stability of current-carrying states with quasi-momentum K in the Bose-condensed phase of the hard-core Bose-Hubbard model on a square lattice, where particles transfer between two sites separated by distance r with hopping amplitude decaying algebraically with r as r-α. Using a mean-field theory, we analyze the excitation spectrum and determine the critical quasi-momenta associated with Landau and dynamical instabilities. We find that the long-range hopping suppresses the critical quasi-momenta and makes them vanish at α=3. Near α=3, we show that the critical quasi-momentum Kc for the dynamical instability exhibits the scaling behavior Kc Δ1+Δ with Δ=α-3, where the scaling exponent explicitly depends on Δ, as a consequence of the long-range nature of the hopping.