Dynamic freezing and defect suppression in the tilted one-dimensional Bose-Hubbard model

Abstract

We study the dynamics of tilted one-dimensional Bose-Hubbard model for two distinct protocols using numerical diagonalization for finite sized system (N 18). The first protocol involves periodic variation of the effective electric field E seen by the bosons which takes the system twice (per drive cycle) through the intermediate quantum critical point. We show that such a drive leads to non-monotonic variations of the excitation density D and the wavefunction overlap F at the end of a drive cycle as a function of the drive frequency ω1, relate this effect to a generalized version of St\"uckelberg interference phenomenon, and identify special frequencies for which D and 1-F approach zero leading to near-perfect dynamic freezing phenomenon. The second protocol involves a ramp of both the electric field E (with a rate ω1) and the boson hopping parameter J (with a rate ω2) to the quantum critical point. We find that both D and the residual energy Q decrease with increasing ω2; our results thus demonstrate a method of achieving near-adiabatic protocol in an experimentally realizable quantum critical system. We suggest experiments to test our theory.